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kpeter (Peter Kovacs)
kpeter@inf.elte.hu
Various doc improvements (#248) - Rename all the ugly template parameters (too long and/or starting with an underscore). - Rename function parameters starting with an underscore. - Extend the doc for many classes. - Use LaTeX-style O(...) expressions only for the complicated ones. - A lot of small unification changes. - Small fixes. - Some other improvements.
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/* -*- mode: C++; indent-tabs-mode: nil; -*-
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 *
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 * This file is a part of LEMON, a generic C++ optimization library.
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 *
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 * Copyright (C) 2003-2009
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 * Egervary Jeno Kombinatorikus Optimalizalasi Kutatocsoport
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 * (Egervary Research Group on Combinatorial Optimization, EGRES).
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 *
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 * Permission to use, modify and distribute this software is granted
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 * provided that this copyright notice appears in all copies. For
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 * precise terms see the accompanying LICENSE file.
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 *
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 * This software is provided "AS IS" with no warranty of any kind,
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 * express or implied, and with no claim as to its suitability for any
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 * purpose.
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 *
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 */
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namespace lemon {
20 20

	
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/**
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@defgroup datas Data Structures
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This group describes the several data structures implemented in LEMON.
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This group contains the several data structures implemented in LEMON.
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*/
25 25

	
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/**
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@defgroup graphs Graph Structures
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@ingroup datas
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\brief Graph structures implemented in LEMON.
30 30

	
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The implementation of combinatorial algorithms heavily relies on
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efficient graph implementations. LEMON offers data structures which are
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planned to be easily used in an experimental phase of implementation studies,
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and thereafter the program code can be made efficient by small modifications.
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The most efficient implementation of diverse applications require the
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usage of different physical graph implementations. These differences
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appear in the size of graph we require to handle, memory or time usage
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limitations or in the set of operations through which the graph can be
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accessed.  LEMON provides several physical graph structures to meet
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the diverging requirements of the possible users.  In order to save on
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running time or on memory usage, some structures may fail to provide
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some graph features like arc/edge or node deletion.
44 44

	
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Alteration of standard containers need a very limited number of
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operations, these together satisfy the everyday requirements.
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In the case of graph structures, different operations are needed which do
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not alter the physical graph, but gives another view. If some nodes or
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arcs have to be hidden or the reverse oriented graph have to be used, then
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this is the case. It also may happen that in a flow implementation
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the residual graph can be accessed by another algorithm, or a node-set
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is to be shrunk for another algorithm.
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LEMON also provides a variety of graphs for these requirements called
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\ref graph_adaptors "graph adaptors". Adaptors cannot be used alone but only
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in conjunction with other graph representations.
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57 57
You are free to use the graph structure that fit your requirements
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the best, most graph algorithms and auxiliary data structures can be used
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with any graph structure.
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<b>See also:</b> \ref graph_concepts "Graph Structure Concepts".
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*/
63 63

	
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/**
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@defgroup graph_adaptors Adaptor Classes for Graphs
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@ingroup graphs
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\brief Adaptor classes for digraphs and graphs
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This group contains several useful adaptor classes for digraphs and graphs.
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The main parts of LEMON are the different graph structures, generic
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graph algorithms, graph concepts, which couple them, and graph
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adaptors. While the previous notions are more or less clear, the
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latter one needs further explanation. Graph adaptors are graph classes
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which serve for considering graph structures in different ways.
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A short example makes this much clearer.  Suppose that we have an
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instance \c g of a directed graph type, say ListDigraph and an algorithm
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\code
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template <typename Digraph>
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int algorithm(const Digraph&);
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\endcode
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is needed to run on the reverse oriented graph.  It may be expensive
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(in time or in memory usage) to copy \c g with the reversed
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arcs.  In this case, an adaptor class is used, which (according
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to LEMON \ref concepts::Digraph "digraph concepts") works as a digraph.
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The adaptor uses the original digraph structure and digraph operations when
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methods of the reversed oriented graph are called.  This means that the adaptor
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have minor memory usage, and do not perform sophisticated algorithmic
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actions.  The purpose of it is to give a tool for the cases when a
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graph have to be used in a specific alteration.  If this alteration is
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obtained by a usual construction like filtering the node or the arc set or
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considering a new orientation, then an adaptor is worthwhile to use.
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To come back to the reverse oriented graph, in this situation
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\code
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template<typename Digraph> class ReverseDigraph;
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\endcode
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template class can be used. The code looks as follows
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\code
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ListDigraph g;
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ReverseDigraph<ListDigraph> rg(g);
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int result = algorithm(rg);
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\endcode
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During running the algorithm, the original digraph \c g is untouched.
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This techniques give rise to an elegant code, and based on stable
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graph adaptors, complex algorithms can be implemented easily.
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108 108
In flow, circulation and matching problems, the residual
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graph is of particular importance. Combining an adaptor implementing
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this with shortest path algorithms or minimum mean cycle algorithms,
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a range of weighted and cardinality optimization algorithms can be
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obtained. For other examples, the interested user is referred to the
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detailed documentation of particular adaptors.
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The behavior of graph adaptors can be very different. Some of them keep
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capabilities of the original graph while in other cases this would be
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meaningless. This means that the concepts that they meet depend
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on the graph adaptor, and the wrapped graph.
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For example, if an arc of a reversed digraph is deleted, this is carried
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out by deleting the corresponding arc of the original digraph, thus the
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adaptor modifies the original digraph.
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However in case of a residual digraph, this operation has no sense.
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124 124
Let us stand one more example here to simplify your work.
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ReverseDigraph has constructor
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\code
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ReverseDigraph(Digraph& digraph);
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\endcode
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This means that in a situation, when a <tt>const %ListDigraph&</tt>
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reference to a graph is given, then it have to be instantiated with
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<tt>Digraph=const %ListDigraph</tt>.
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\code
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int algorithm1(const ListDigraph& g) {
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  ReverseDigraph<const ListDigraph> rg(g);
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  return algorithm2(rg);
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}
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\endcode
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*/
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/**
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@defgroup semi_adaptors Semi-Adaptor Classes for Graphs
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@ingroup graphs
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\brief Graph types between real graphs and graph adaptors.
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This group describes some graph types between real graphs and graph adaptors.
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This group contains some graph types between real graphs and graph adaptors.
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These classes wrap graphs to give new functionality as the adaptors do it.
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On the other hand they are not light-weight structures as the adaptors.
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*/
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150 150
/**
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@defgroup maps Maps
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@ingroup datas
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\brief Map structures implemented in LEMON.
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This group describes the map structures implemented in LEMON.
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This group contains the map structures implemented in LEMON.
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157 157
LEMON provides several special purpose maps and map adaptors that e.g. combine
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new maps from existing ones.
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<b>See also:</b> \ref map_concepts "Map Concepts".
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*/
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163 163
/**
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@defgroup graph_maps Graph Maps
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@ingroup maps
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\brief Special graph-related maps.
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This group describes maps that are specifically designed to assign
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This group contains maps that are specifically designed to assign
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values to the nodes and arcs/edges of graphs.
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If you are looking for the standard graph maps (\c NodeMap, \c ArcMap,
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\c EdgeMap), see the \ref graph_concepts "Graph Structure Concepts".
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*/
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/**
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\defgroup map_adaptors Map Adaptors
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\ingroup maps
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\brief Tools to create new maps from existing ones
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This group describes map adaptors that are used to create "implicit"
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This group contains map adaptors that are used to create "implicit"
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maps from other maps.
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Most of them are \ref concepts::ReadMap "read-only maps".
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They can make arithmetic and logical operations between one or two maps
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(negation, shifting, addition, multiplication, logical 'and', 'or',
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'not' etc.) or e.g. convert a map to another one of different Value type.
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188 188
The typical usage of this classes is passing implicit maps to
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algorithms.  If a function type algorithm is called then the function
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type map adaptors can be used comfortable. For example let's see the
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usage of map adaptors with the \c graphToEps() function.
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\code
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  Color nodeColor(int deg) {
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    if (deg >= 2) {
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      return Color(0.5, 0.0, 0.5);
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    } else if (deg == 1) {
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      return Color(1.0, 0.5, 1.0);
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    } else {
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      return Color(0.0, 0.0, 0.0);
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    }
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  }
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  Digraph::NodeMap<int> degree_map(graph);
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  graphToEps(graph, "graph.eps")
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    .coords(coords).scaleToA4().undirected()
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    .nodeColors(composeMap(functorToMap(nodeColor), degree_map))
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    .run();
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\endcode
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The \c functorToMap() function makes an \c int to \c Color map from the
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\c nodeColor() function. The \c composeMap() compose the \c degree_map
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and the previously created map. The composed map is a proper function to
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get the color of each node.
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The usage with class type algorithms is little bit harder. In this
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case the function type map adaptors can not be used, because the
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function map adaptors give back temporary objects.
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\code
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  Digraph graph;
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  typedef Digraph::ArcMap<double> DoubleArcMap;
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  DoubleArcMap length(graph);
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  DoubleArcMap speed(graph);
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  typedef DivMap<DoubleArcMap, DoubleArcMap> TimeMap;
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  TimeMap time(length, speed);
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  Dijkstra<Digraph, TimeMap> dijkstra(graph, time);
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  dijkstra.run(source, target);
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\endcode
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We have a length map and a maximum speed map on the arcs of a digraph.
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The minimum time to pass the arc can be calculated as the division of
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the two maps which can be done implicitly with the \c DivMap template
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class. We use the implicit minimum time map as the length map of the
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\c Dijkstra algorithm.
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*/
237 237

	
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/**
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@defgroup matrices Matrices
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@ingroup datas
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\brief Two dimensional data storages implemented in LEMON.
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This group describes two dimensional data storages implemented in LEMON.
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This group contains two dimensional data storages implemented in LEMON.
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*/
245 245

	
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/**
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@defgroup paths Path Structures
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@ingroup datas
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\brief %Path structures implemented in LEMON.
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This group describes the path structures implemented in LEMON.
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This group contains the path structures implemented in LEMON.
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LEMON provides flexible data structures to work with paths.
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All of them have similar interfaces and they can be copied easily with
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assignment operators and copy constructors. This makes it easy and
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efficient to have e.g. the Dijkstra algorithm to store its result in
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any kind of path structure.
258 258

	
259 259
\sa lemon::concepts::Path
260 260
*/
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262 262
/**
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@defgroup auxdat Auxiliary Data Structures
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@ingroup datas
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\brief Auxiliary data structures implemented in LEMON.
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This group describes some data structures implemented in LEMON in
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This group contains some data structures implemented in LEMON in
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order to make it easier to implement combinatorial algorithms.
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*/
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/**
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@defgroup algs Algorithms
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\brief This group describes the several algorithms
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\brief This group contains the several algorithms
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implemented in LEMON.
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This group describes the several algorithms
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This group contains the several algorithms
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implemented in LEMON.
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*/
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/**
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@defgroup search Graph Search
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@ingroup algs
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\brief Common graph search algorithms.
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285
This group describes the common graph search algorithms, namely
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This group contains the common graph search algorithms, namely
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\e breadth-first \e search (BFS) and \e depth-first \e search (DFS).
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*/
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/**
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@defgroup shortest_path Shortest Path Algorithms
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@ingroup algs
292 292
\brief Algorithms for finding shortest paths.
293 293

	
294
This group describes the algorithms for finding shortest paths in digraphs.
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This group contains the algorithms for finding shortest paths in digraphs.
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296 296
 - \ref Dijkstra algorithm for finding shortest paths from a source node
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   when all arc lengths are non-negative.
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 - \ref BellmanFord "Bellman-Ford" algorithm for finding shortest paths
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   from a source node when arc lenghts can be either positive or negative,
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   but the digraph should not contain directed cycles with negative total
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   length.
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 - \ref FloydWarshall "Floyd-Warshall" and \ref Johnson "Johnson" algorithms
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   for solving the \e all-pairs \e shortest \e paths \e problem when arc
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   lenghts can be either positive or negative, but the digraph should
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   not contain directed cycles with negative total length.
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 - \ref Suurballe A successive shortest path algorithm for finding
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   arc-disjoint paths between two nodes having minimum total length.
308 308
*/
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310 310
/**
311 311
@defgroup max_flow Maximum Flow Algorithms
312 312
@ingroup algs
313 313
\brief Algorithms for finding maximum flows.
314 314

	
315
This group describes the algorithms for finding maximum flows and
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This group contains the algorithms for finding maximum flows and
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feasible circulations.
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The \e maximum \e flow \e problem is to find a flow of maximum value between
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a single source and a single target. Formally, there is a \f$G=(V,A)\f$
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digraph, a \f$cap:A\rightarrow\mathbf{R}^+_0\f$ capacity function and
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\f$s, t \in V\f$ source and target nodes.
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A maximum flow is an \f$f:A\rightarrow\mathbf{R}^+_0\f$ solution of the
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following optimization problem.
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325 325
\f[ \max\sum_{a\in\delta_{out}(s)}f(a) - \sum_{a\in\delta_{in}(s)}f(a) \f]
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\f[ \sum_{a\in\delta_{out}(v)} f(a) = \sum_{a\in\delta_{in}(v)} f(a)
327 327
    \qquad \forall v\in V\setminus\{s,t\} \f]
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\f[ 0 \leq f(a) \leq cap(a) \qquad \forall a\in A \f]
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330 330
LEMON contains several algorithms for solving maximum flow problems:
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- \ref EdmondsKarp Edmonds-Karp algorithm.
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- \ref Preflow Goldberg-Tarjan's preflow push-relabel algorithm.
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- \ref DinitzSleatorTarjan Dinitz's blocking flow algorithm with dynamic trees.
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- \ref GoldbergTarjan Preflow push-relabel algorithm with dynamic trees.
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336 336
In most cases the \ref Preflow "Preflow" algorithm provides the
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fastest method for computing a maximum flow. All implementations
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provides functions to also query the minimum cut, which is the dual
339 339
problem of the maximum flow.
340 340
*/
341 341

	
342 342
/**
343 343
@defgroup min_cost_flow Minimum Cost Flow Algorithms
344 344
@ingroup algs
345 345

	
346 346
\brief Algorithms for finding minimum cost flows and circulations.
347 347

	
348
This group describes the algorithms for finding minimum cost flows and
348
This group contains the algorithms for finding minimum cost flows and
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circulations.
350 350

	
351 351
The \e minimum \e cost \e flow \e problem is to find a feasible flow of
352 352
minimum total cost from a set of supply nodes to a set of demand nodes
353 353
in a network with capacity constraints and arc costs.
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Formally, let \f$G=(V,A)\f$ be a digraph,
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\f$lower, upper: A\rightarrow\mathbf{Z}^+_0\f$ denote the lower and
356 356
upper bounds for the flow values on the arcs,
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\f$cost: A\rightarrow\mathbf{Z}^+_0\f$ denotes the cost per unit flow
358 358
on the arcs, and
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\f$supply: V\rightarrow\mathbf{Z}\f$ denotes the supply/demand values
360 360
of the nodes.
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A minimum cost flow is an \f$f:A\rightarrow\mathbf{R}^+_0\f$ solution of
362 362
the following optimization problem.
363 363

	
364 364
\f[ \min\sum_{a\in A} f(a) cost(a) \f]
365 365
\f[ \sum_{a\in\delta_{out}(v)} f(a) - \sum_{a\in\delta_{in}(v)} f(a) =
366 366
    supply(v) \qquad \forall v\in V \f]
367 367
\f[ lower(a) \leq f(a) \leq upper(a) \qquad \forall a\in A \f]
368 368

	
369 369
LEMON contains several algorithms for solving minimum cost flow problems:
370 370
 - \ref CycleCanceling Cycle-canceling algorithms.
371 371
 - \ref CapacityScaling Successive shortest path algorithm with optional
372 372
   capacity scaling.
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 - \ref CostScaling Push-relabel and augment-relabel algorithms based on
374 374
   cost scaling.
375 375
 - \ref NetworkSimplex Primal network simplex algorithm with various
376 376
   pivot strategies.
377 377
*/
378 378

	
379 379
/**
380 380
@defgroup min_cut Minimum Cut Algorithms
381 381
@ingroup algs
382 382

	
383 383
\brief Algorithms for finding minimum cut in graphs.
384 384

	
385
This group describes the algorithms for finding minimum cut in graphs.
385
This group contains the algorithms for finding minimum cut in graphs.
386 386

	
387 387
The \e minimum \e cut \e problem is to find a non-empty and non-complete
388 388
\f$X\f$ subset of the nodes with minimum overall capacity on
389 389
outgoing arcs. Formally, there is a \f$G=(V,A)\f$ digraph, a
390 390
\f$cap: A\rightarrow\mathbf{R}^+_0\f$ capacity function. The minimum
391 391
cut is the \f$X\f$ solution of the next optimization problem:
392 392

	
393 393
\f[ \min_{X \subset V, X\not\in \{\emptyset, V\}}
394 394
    \sum_{uv\in A, u\in X, v\not\in X}cap(uv) \f]
395 395

	
396 396
LEMON contains several algorithms related to minimum cut problems:
397 397

	
398 398
- \ref HaoOrlin "Hao-Orlin algorithm" for calculating minimum cut
399 399
  in directed graphs.
400 400
- \ref NagamochiIbaraki "Nagamochi-Ibaraki algorithm" for
401 401
  calculating minimum cut in undirected graphs.
402
- \ref GomoryHuTree "Gomory-Hu tree computation" for calculating
402
- \ref GomoryHu "Gomory-Hu tree computation" for calculating
403 403
  all-pairs minimum cut in undirected graphs.
404 404

	
405 405
If you want to find minimum cut just between two distinict nodes,
406 406
see the \ref max_flow "maximum flow problem".
407 407
*/
408 408

	
409 409
/**
410 410
@defgroup graph_prop Connectivity and Other Graph Properties
411 411
@ingroup algs
412 412
\brief Algorithms for discovering the graph properties
413 413

	
414
This group describes the algorithms for discovering the graph properties
414
This group contains the algorithms for discovering the graph properties
415 415
like connectivity, bipartiteness, euler property, simplicity etc.
416 416

	
417 417
\image html edge_biconnected_components.png
418 418
\image latex edge_biconnected_components.eps "bi-edge-connected components" width=\textwidth
419 419
*/
420 420

	
421 421
/**
422 422
@defgroup planar Planarity Embedding and Drawing
423 423
@ingroup algs
424 424
\brief Algorithms for planarity checking, embedding and drawing
425 425

	
426
This group describes the algorithms for planarity checking,
426
This group contains the algorithms for planarity checking,
427 427
embedding and drawing.
428 428

	
429 429
\image html planar.png
430 430
\image latex planar.eps "Plane graph" width=\textwidth
431 431
*/
432 432

	
433 433
/**
434 434
@defgroup matching Matching Algorithms
435 435
@ingroup algs
436 436
\brief Algorithms for finding matchings in graphs and bipartite graphs.
437 437

	
438 438
This group contains algorithm objects and functions to calculate
439 439
matchings in graphs and bipartite graphs. The general matching problem is
440 440
finding a subset of the arcs which does not shares common endpoints.
441 441

	
442 442
There are several different algorithms for calculate matchings in
443 443
graphs.  The matching problems in bipartite graphs are generally
444 444
easier than in general graphs. The goal of the matching optimization
445 445
can be finding maximum cardinality, maximum weight or minimum cost
446 446
matching. The search can be constrained to find perfect or
447 447
maximum cardinality matching.
448 448

	
449 449
The matching algorithms implemented in LEMON:
450 450
- \ref MaxBipartiteMatching Hopcroft-Karp augmenting path algorithm
451 451
  for calculating maximum cardinality matching in bipartite graphs.
452 452
- \ref PrBipartiteMatching Push-relabel algorithm
453 453
  for calculating maximum cardinality matching in bipartite graphs.
454 454
- \ref MaxWeightedBipartiteMatching
455 455
  Successive shortest path algorithm for calculating maximum weighted
456 456
  matching and maximum weighted bipartite matching in bipartite graphs.
457 457
- \ref MinCostMaxBipartiteMatching
458 458
  Successive shortest path algorithm for calculating minimum cost maximum
459 459
  matching in bipartite graphs.
460 460
- \ref MaxMatching Edmond's blossom shrinking algorithm for calculating
461 461
  maximum cardinality matching in general graphs.
462 462
- \ref MaxWeightedMatching Edmond's blossom shrinking algorithm for calculating
463 463
  maximum weighted matching in general graphs.
464 464
- \ref MaxWeightedPerfectMatching
465 465
  Edmond's blossom shrinking algorithm for calculating maximum weighted
466 466
  perfect matching in general graphs.
467 467

	
468 468
\image html bipartite_matching.png
469 469
\image latex bipartite_matching.eps "Bipartite Matching" width=\textwidth
470 470
*/
471 471

	
472 472
/**
473 473
@defgroup spantree Minimum Spanning Tree Algorithms
474 474
@ingroup algs
475 475
\brief Algorithms for finding a minimum cost spanning tree in a graph.
476 476

	
477
This group describes the algorithms for finding a minimum cost spanning
477
This group contains the algorithms for finding a minimum cost spanning
478 478
tree in a graph.
479 479
*/
480 480

	
481 481
/**
482 482
@defgroup auxalg Auxiliary Algorithms
483 483
@ingroup algs
484 484
\brief Auxiliary algorithms implemented in LEMON.
485 485

	
486
This group describes some algorithms implemented in LEMON
486
This group contains some algorithms implemented in LEMON
487 487
in order to make it easier to implement complex algorithms.
488 488
*/
489 489

	
490 490
/**
491 491
@defgroup approx Approximation Algorithms
492 492
@ingroup algs
493 493
\brief Approximation algorithms.
494 494

	
495
This group describes the approximation and heuristic algorithms
495
This group contains the approximation and heuristic algorithms
496 496
implemented in LEMON.
497 497
*/
498 498

	
499 499
/**
500 500
@defgroup gen_opt_group General Optimization Tools
501
\brief This group describes some general optimization frameworks
501
\brief This group contains some general optimization frameworks
502 502
implemented in LEMON.
503 503

	
504
This group describes some general optimization frameworks
504
This group contains some general optimization frameworks
505 505
implemented in LEMON.
506 506
*/
507 507

	
508 508
/**
509 509
@defgroup lp_group Lp and Mip Solvers
510 510
@ingroup gen_opt_group
511 511
\brief Lp and Mip solver interfaces for LEMON.
512 512

	
513
This group describes Lp and Mip solver interfaces for LEMON. The
513
This group contains Lp and Mip solver interfaces for LEMON. The
514 514
various LP solvers could be used in the same manner with this
515 515
interface.
516 516
*/
517 517

	
518 518
/**
519 519
@defgroup lp_utils Tools for Lp and Mip Solvers
520 520
@ingroup lp_group
521 521
\brief Helper tools to the Lp and Mip solvers.
522 522

	
523 523
This group adds some helper tools to general optimization framework
524 524
implemented in LEMON.
525 525
*/
526 526

	
527 527
/**
528 528
@defgroup metah Metaheuristics
529 529
@ingroup gen_opt_group
530 530
\brief Metaheuristics for LEMON library.
531 531

	
532
This group describes some metaheuristic optimization tools.
532
This group contains some metaheuristic optimization tools.
533 533
*/
534 534

	
535 535
/**
536 536
@defgroup utils Tools and Utilities
537 537
\brief Tools and utilities for programming in LEMON
538 538

	
539 539
Tools and utilities for programming in LEMON.
540 540
*/
541 541

	
542 542
/**
543 543
@defgroup gutils Basic Graph Utilities
544 544
@ingroup utils
545 545
\brief Simple basic graph utilities.
546 546

	
547
This group describes some simple basic graph utilities.
547
This group contains some simple basic graph utilities.
548 548
*/
549 549

	
550 550
/**
551 551
@defgroup misc Miscellaneous Tools
552 552
@ingroup utils
553 553
\brief Tools for development, debugging and testing.
554 554

	
555
This group describes several useful tools for development,
555
This group contains several useful tools for development,
556 556
debugging and testing.
557 557
*/
558 558

	
559 559
/**
560 560
@defgroup timecount Time Measuring and Counting
561 561
@ingroup misc
562 562
\brief Simple tools for measuring the performance of algorithms.
563 563

	
564
This group describes simple tools for measuring the performance
564
This group contains simple tools for measuring the performance
565 565
of algorithms.
566 566
*/
567 567

	
568 568
/**
569 569
@defgroup exceptions Exceptions
570 570
@ingroup utils
571 571
\brief Exceptions defined in LEMON.
572 572

	
573
This group describes the exceptions defined in LEMON.
573
This group contains the exceptions defined in LEMON.
574 574
*/
575 575

	
576 576
/**
577 577
@defgroup io_group Input-Output
578 578
\brief Graph Input-Output methods
579 579

	
580
This group describes the tools for importing and exporting graphs
580
This group contains the tools for importing and exporting graphs
581 581
and graph related data. Now it supports the \ref lgf-format
582 582
"LEMON Graph Format", the \c DIMACS format and the encapsulated
583 583
postscript (EPS) format.
584 584
*/
585 585

	
586 586
/**
587 587
@defgroup lemon_io LEMON Graph Format
588 588
@ingroup io_group
589 589
\brief Reading and writing LEMON Graph Format.
590 590

	
591
This group describes methods for reading and writing
591
This group contains methods for reading and writing
592 592
\ref lgf-format "LEMON Graph Format".
593 593
*/
594 594

	
595 595
/**
596 596
@defgroup eps_io Postscript Exporting
597 597
@ingroup io_group
598 598
\brief General \c EPS drawer and graph exporter
599 599

	
600
This group describes general \c EPS drawing methods and special
600
This group contains general \c EPS drawing methods and special
601 601
graph exporting tools.
602 602
*/
603 603

	
604 604
/**
605 605
@defgroup dimacs_group DIMACS format
606 606
@ingroup io_group
607 607
\brief Read and write files in DIMACS format
608 608

	
609 609
Tools to read a digraph from or write it to a file in DIMACS format data.
610 610
*/
611 611

	
612 612
/**
613 613
@defgroup nauty_group NAUTY Format
614 614
@ingroup io_group
615 615
\brief Read \e Nauty format
616 616

	
617 617
Tool to read graphs from \e Nauty format data.
618 618
*/
619 619

	
620 620
/**
621 621
@defgroup concept Concepts
622 622
\brief Skeleton classes and concept checking classes
623 623

	
624
This group describes the data/algorithm skeletons and concept checking
624
This group contains the data/algorithm skeletons and concept checking
625 625
classes implemented in LEMON.
626 626

	
627 627
The purpose of the classes in this group is fourfold.
628 628

	
629 629
- These classes contain the documentations of the %concepts. In order
630 630
  to avoid document multiplications, an implementation of a concept
631 631
  simply refers to the corresponding concept class.
632 632

	
633 633
- These classes declare every functions, <tt>typedef</tt>s etc. an
634 634
  implementation of the %concepts should provide, however completely
635 635
  without implementations and real data structures behind the
636 636
  interface. On the other hand they should provide nothing else. All
637 637
  the algorithms working on a data structure meeting a certain concept
638 638
  should compile with these classes. (Though it will not run properly,
639 639
  of course.) In this way it is easily to check if an algorithm
640 640
  doesn't use any extra feature of a certain implementation.
641 641

	
642 642
- The concept descriptor classes also provide a <em>checker class</em>
643 643
  that makes it possible to check whether a certain implementation of a
644 644
  concept indeed provides all the required features.
645 645

	
646 646
- Finally, They can serve as a skeleton of a new implementation of a concept.
647 647
*/
648 648

	
649 649
/**
650 650
@defgroup graph_concepts Graph Structure Concepts
651 651
@ingroup concept
652 652
\brief Skeleton and concept checking classes for graph structures
653 653

	
654
This group describes the skeletons and concept checking classes of LEMON's
654
This group contains the skeletons and concept checking classes of LEMON's
655 655
graph structures and helper classes used to implement these.
656 656
*/
657 657

	
658 658
/**
659 659
@defgroup map_concepts Map Concepts
660 660
@ingroup concept
661 661
\brief Skeleton and concept checking classes for maps
662 662

	
663
This group describes the skeletons and concept checking classes of maps.
663
This group contains the skeletons and concept checking classes of maps.
664 664
*/
665 665

	
666 666
/**
667 667
\anchor demoprograms
668 668

	
669 669
@defgroup demos Demo Programs
670 670

	
671 671
Some demo programs are listed here. Their full source codes can be found in
672 672
the \c demo subdirectory of the source tree.
673 673

	
674 674
It order to compile them, use <tt>--enable-demo</tt> configure option when
675 675
build the library.
676 676
*/
677 677

	
678 678
/**
679 679
@defgroup tools Standalone Utility Applications
680 680

	
681 681
Some utility applications are listed here.
682 682

	
683 683
The standard compilation procedure (<tt>./configure;make</tt>) will compile
684 684
them, as well.
685 685
*/
686 686

	
687 687
}
Ignore white space 3072 line context
1 1
/* -*- mode: C++; indent-tabs-mode: nil; -*-
2 2
 *
3 3
 * This file is a part of LEMON, a generic C++ optimization library.
4 4
 *
5 5
 * Copyright (C) 2003-2009
6 6
 * Egervary Jeno Kombinatorikus Optimalizalasi Kutatocsoport
7 7
 * (Egervary Research Group on Combinatorial Optimization, EGRES).
8 8
 *
9 9
 * Permission to use, modify and distribute this software is granted
10 10
 * provided that this copyright notice appears in all copies. For
11 11
 * precise terms see the accompanying LICENSE file.
12 12
 *
13 13
 * This software is provided "AS IS" with no warranty of any kind,
14 14
 * express or implied, and with no claim as to its suitability for any
15 15
 * purpose.
16 16
 *
17 17
 */
18 18

	
19 19
/**
20 20
\mainpage LEMON Documentation
21 21

	
22 22
\section intro Introduction
23 23

	
24 24
\subsection whatis What is LEMON
25 25

	
26 26
LEMON stands for
27 27
<b>L</b>ibrary of <b>E</b>fficient <b>M</b>odels
28 28
and <b>O</b>ptimization in <b>N</b>etworks.
29 29
It is a C++ template
30 30
library aimed at combinatorial optimization tasks which
31 31
often involve in working
32 32
with graphs.
33 33

	
34 34
<b>
35 35
LEMON is an <a class="el" href="http://opensource.org/">open&nbsp;source</a>
36 36
project.
37 37
You are free to use it in your commercial or
38 38
non-commercial applications under very permissive
39 39
\ref license "license terms".
40 40
</b>
41 41

	
42 42
\subsection howtoread How to read the documentation
43 43

	
44 44
If you want to get a quick start and see the most important features then
45 45
take a look at our \ref quicktour
46 46
"Quick Tour to LEMON" which will guide you along.
47 47

	
48
If you already feel like using our library, see the page that tells you
49
\ref getstart "How to start using LEMON".
50

	
51
If you
52
want to see how LEMON works, see
53
some \ref demoprograms "demo programs".
48
If you already feel like using our library, see the
49
<a class="el" href="http://lemon.cs.elte.hu/pub/tutorial/">LEMON Tutorial</a>.
54 50

	
55 51
If you know what you are looking for then try to find it under the
56
<a class="el" href="modules.html">Modules</a>
57
section.
52
<a class="el" href="modules.html">Modules</a> section.
58 53

	
59 54
If you are a user of the old (0.x) series of LEMON, please check out the
60 55
\ref migration "Migration Guide" for the backward incompatibilities.
61 56
*/
Ignore white space 3072 line context
... ...
@@ -721,2875 +721,2876 @@
721 721
  /// It can also be specified to be \c const.
722 722
  /// \tparam NF The type of the node filter map.
723 723
  /// It must be a \c bool (or convertible) node map of the
724 724
  /// adapted digraph. The default type is
725 725
  /// \ref concepts::Digraph::NodeMap "DGR::NodeMap<bool>".
726 726
  /// \tparam AF The type of the arc filter map.
727 727
  /// It must be \c bool (or convertible) arc map of the
728 728
  /// adapted digraph. The default type is
729 729
  /// \ref concepts::Digraph::ArcMap "DGR::ArcMap<bool>".
730 730
  ///
731 731
  /// \note The \c Node and \c Arc types of this adaptor and the adapted
732 732
  /// digraph are convertible to each other.
733 733
  ///
734 734
  /// \see FilterNodes
735 735
  /// \see FilterArcs
736 736
#ifdef DOXYGEN
737 737
  template<typename DGR, typename NF, typename AF>
738 738
  class SubDigraph {
739 739
#else
740 740
  template<typename DGR,
741 741
           typename NF = typename DGR::template NodeMap<bool>,
742 742
           typename AF = typename DGR::template ArcMap<bool> >
743 743
  class SubDigraph :
744 744
    public DigraphAdaptorExtender<SubDigraphBase<DGR, NF, AF, true> > {
745 745
#endif
746 746
  public:
747 747
    /// The type of the adapted digraph.
748 748
    typedef DGR Digraph;
749 749
    /// The type of the node filter map.
750 750
    typedef NF NodeFilterMap;
751 751
    /// The type of the arc filter map.
752 752
    typedef AF ArcFilterMap;
753 753

	
754 754
    typedef DigraphAdaptorExtender<SubDigraphBase<DGR, NF, AF, true> >
755 755
      Parent;
756 756

	
757 757
    typedef typename Parent::Node Node;
758 758
    typedef typename Parent::Arc Arc;
759 759

	
760 760
  protected:
761 761
    SubDigraph() { }
762 762
  public:
763 763

	
764 764
    /// \brief Constructor
765 765
    ///
766 766
    /// Creates a subdigraph for the given digraph with the
767 767
    /// given node and arc filter maps.
768 768
    SubDigraph(DGR& digraph, NF& node_filter, AF& arc_filter) {
769 769
      Parent::initialize(digraph, node_filter, arc_filter);
770 770
    }
771 771

	
772 772
    /// \brief Sets the status of the given node
773 773
    ///
774 774
    /// This function sets the status of the given node.
775 775
    /// It is done by simply setting the assigned value of \c n
776 776
    /// to \c v in the node filter map.
777 777
    void status(const Node& n, bool v) const { Parent::status(n, v); }
778 778

	
779 779
    /// \brief Sets the status of the given arc
780 780
    ///
781 781
    /// This function sets the status of the given arc.
782 782
    /// It is done by simply setting the assigned value of \c a
783 783
    /// to \c v in the arc filter map.
784 784
    void status(const Arc& a, bool v) const { Parent::status(a, v); }
785 785

	
786 786
    /// \brief Returns the status of the given node
787 787
    ///
788 788
    /// This function returns the status of the given node.
789 789
    /// It is \c true if the given node is enabled (i.e. not hidden).
790 790
    bool status(const Node& n) const { return Parent::status(n); }
791 791

	
792 792
    /// \brief Returns the status of the given arc
793 793
    ///
794 794
    /// This function returns the status of the given arc.
795 795
    /// It is \c true if the given arc is enabled (i.e. not hidden).
796 796
    bool status(const Arc& a) const { return Parent::status(a); }
797 797

	
798 798
    /// \brief Disables the given node
799 799
    ///
800 800
    /// This function disables the given node in the subdigraph,
801 801
    /// so the iteration jumps over it.
802 802
    /// It is the same as \ref status() "status(n, false)".
803 803
    void disable(const Node& n) const { Parent::status(n, false); }
804 804

	
805 805
    /// \brief Disables the given arc
806 806
    ///
807 807
    /// This function disables the given arc in the subdigraph,
808 808
    /// so the iteration jumps over it.
809 809
    /// It is the same as \ref status() "status(a, false)".
810 810
    void disable(const Arc& a) const { Parent::status(a, false); }
811 811

	
812 812
    /// \brief Enables the given node
813 813
    ///
814 814
    /// This function enables the given node in the subdigraph.
815 815
    /// It is the same as \ref status() "status(n, true)".
816 816
    void enable(const Node& n) const { Parent::status(n, true); }
817 817

	
818 818
    /// \brief Enables the given arc
819 819
    ///
820 820
    /// This function enables the given arc in the subdigraph.
821 821
    /// It is the same as \ref status() "status(a, true)".
822 822
    void enable(const Arc& a) const { Parent::status(a, true); }
823 823

	
824 824
  };
825 825

	
826 826
  /// \brief Returns a read-only SubDigraph adaptor
827 827
  ///
828 828
  /// This function just returns a read-only \ref SubDigraph adaptor.
829 829
  /// \ingroup graph_adaptors
830 830
  /// \relates SubDigraph
831 831
  template<typename DGR, typename NF, typename AF>
832 832
  SubDigraph<const DGR, NF, AF>
833 833
  subDigraph(const DGR& digraph,
834 834
             NF& node_filter, AF& arc_filter) {
835 835
    return SubDigraph<const DGR, NF, AF>
836 836
      (digraph, node_filter, arc_filter);
837 837
  }
838 838

	
839 839
  template<typename DGR, typename NF, typename AF>
840 840
  SubDigraph<const DGR, const NF, AF>
841 841
  subDigraph(const DGR& digraph,
842 842
             const NF& node_filter, AF& arc_filter) {
843 843
    return SubDigraph<const DGR, const NF, AF>
844 844
      (digraph, node_filter, arc_filter);
845 845
  }
846 846

	
847 847
  template<typename DGR, typename NF, typename AF>
848 848
  SubDigraph<const DGR, NF, const AF>
849 849
  subDigraph(const DGR& digraph,
850 850
             NF& node_filter, const AF& arc_filter) {
851 851
    return SubDigraph<const DGR, NF, const AF>
852 852
      (digraph, node_filter, arc_filter);
853 853
  }
854 854

	
855 855
  template<typename DGR, typename NF, typename AF>
856 856
  SubDigraph<const DGR, const NF, const AF>
857 857
  subDigraph(const DGR& digraph,
858 858
             const NF& node_filter, const AF& arc_filter) {
859 859
    return SubDigraph<const DGR, const NF, const AF>
860 860
      (digraph, node_filter, arc_filter);
861 861
  }
862 862

	
863 863

	
864 864
  template <typename GR, typename NF, typename EF, bool ch = true>
865 865
  class SubGraphBase : public GraphAdaptorBase<GR> {
866 866
  public:
867 867
    typedef GR Graph;
868 868
    typedef NF NodeFilterMap;
869 869
    typedef EF EdgeFilterMap;
870 870

	
871 871
    typedef SubGraphBase Adaptor;
872 872
    typedef GraphAdaptorBase<GR> Parent;
873 873
  protected:
874 874

	
875 875
    NF* _node_filter;
876 876
    EF* _edge_filter;
877 877

	
878 878
    SubGraphBase()
879 879
      : Parent(), _node_filter(0), _edge_filter(0) { }
880 880

	
881 881
    void initialize(GR& graph, NF& node_filter, EF& edge_filter) {
882 882
      Parent::initialize(graph);
883 883
      _node_filter = &node_filter;
884 884
      _edge_filter = &edge_filter;
885 885
    }
886 886

	
887 887
  public:
888 888

	
889 889
    typedef typename Parent::Node Node;
890 890
    typedef typename Parent::Arc Arc;
891 891
    typedef typename Parent::Edge Edge;
892 892

	
893 893
    void first(Node& i) const {
894 894
      Parent::first(i);
895 895
      while (i!=INVALID && !(*_node_filter)[i]) Parent::next(i);
896 896
    }
897 897

	
898 898
    void first(Arc& i) const {
899 899
      Parent::first(i);
900 900
      while (i!=INVALID && (!(*_edge_filter)[i]
901 901
                            || !(*_node_filter)[Parent::source(i)]
902 902
                            || !(*_node_filter)[Parent::target(i)]))
903 903
        Parent::next(i);
904 904
    }
905 905

	
906 906
    void first(Edge& i) const {
907 907
      Parent::first(i);
908 908
      while (i!=INVALID && (!(*_edge_filter)[i]
909 909
                            || !(*_node_filter)[Parent::u(i)]
910 910
                            || !(*_node_filter)[Parent::v(i)]))
911 911
        Parent::next(i);
912 912
    }
913 913

	
914 914
    void firstIn(Arc& i, const Node& n) const {
915 915
      Parent::firstIn(i, n);
916 916
      while (i!=INVALID && (!(*_edge_filter)[i]
917 917
                            || !(*_node_filter)[Parent::source(i)]))
918 918
        Parent::nextIn(i);
919 919
    }
920 920

	
921 921
    void firstOut(Arc& i, const Node& n) const {
922 922
      Parent::firstOut(i, n);
923 923
      while (i!=INVALID && (!(*_edge_filter)[i]
924 924
                            || !(*_node_filter)[Parent::target(i)]))
925 925
        Parent::nextOut(i);
926 926
    }
927 927

	
928 928
    void firstInc(Edge& i, bool& d, const Node& n) const {
929 929
      Parent::firstInc(i, d, n);
930 930
      while (i!=INVALID && (!(*_edge_filter)[i]
931 931
                            || !(*_node_filter)[Parent::u(i)]
932 932
                            || !(*_node_filter)[Parent::v(i)]))
933 933
        Parent::nextInc(i, d);
934 934
    }
935 935

	
936 936
    void next(Node& i) const {
937 937
      Parent::next(i);
938 938
      while (i!=INVALID && !(*_node_filter)[i]) Parent::next(i);
939 939
    }
940 940

	
941 941
    void next(Arc& i) const {
942 942
      Parent::next(i);
943 943
      while (i!=INVALID && (!(*_edge_filter)[i]
944 944
                            || !(*_node_filter)[Parent::source(i)]
945 945
                            || !(*_node_filter)[Parent::target(i)]))
946 946
        Parent::next(i);
947 947
    }
948 948

	
949 949
    void next(Edge& i) const {
950 950
      Parent::next(i);
951 951
      while (i!=INVALID && (!(*_edge_filter)[i]
952 952
                            || !(*_node_filter)[Parent::u(i)]
953 953
                            || !(*_node_filter)[Parent::v(i)]))
954 954
        Parent::next(i);
955 955
    }
956 956

	
957 957
    void nextIn(Arc& i) const {
958 958
      Parent::nextIn(i);
959 959
      while (i!=INVALID && (!(*_edge_filter)[i]
960 960
                            || !(*_node_filter)[Parent::source(i)]))
961 961
        Parent::nextIn(i);
962 962
    }
963 963

	
964 964
    void nextOut(Arc& i) const {
965 965
      Parent::nextOut(i);
966 966
      while (i!=INVALID && (!(*_edge_filter)[i]
967 967
                            || !(*_node_filter)[Parent::target(i)]))
968 968
        Parent::nextOut(i);
969 969
    }
970 970

	
971 971
    void nextInc(Edge& i, bool& d) const {
972 972
      Parent::nextInc(i, d);
973 973
      while (i!=INVALID && (!(*_edge_filter)[i]
974 974
                            || !(*_node_filter)[Parent::u(i)]
975 975
                            || !(*_node_filter)[Parent::v(i)]))
976 976
        Parent::nextInc(i, d);
977 977
    }
978 978

	
979 979
    void status(const Node& n, bool v) const { _node_filter->set(n, v); }
980 980
    void status(const Edge& e, bool v) const { _edge_filter->set(e, v); }
981 981

	
982 982
    bool status(const Node& n) const { return (*_node_filter)[n]; }
983 983
    bool status(const Edge& e) const { return (*_edge_filter)[e]; }
984 984

	
985 985
    typedef False NodeNumTag;
986 986
    typedef False ArcNumTag;
987 987
    typedef False EdgeNumTag;
988 988

	
989 989
    typedef FindArcTagIndicator<Graph> FindArcTag;
990 990
    Arc findArc(const Node& u, const Node& v,
991 991
                const Arc& prev = INVALID) const {
992 992
      if (!(*_node_filter)[u] || !(*_node_filter)[v]) {
993 993
        return INVALID;
994 994
      }
995 995
      Arc arc = Parent::findArc(u, v, prev);
996 996
      while (arc != INVALID && !(*_edge_filter)[arc]) {
997 997
        arc = Parent::findArc(u, v, arc);
998 998
      }
999 999
      return arc;
1000 1000
    }
1001 1001

	
1002 1002
    typedef FindEdgeTagIndicator<Graph> FindEdgeTag;
1003 1003
    Edge findEdge(const Node& u, const Node& v,
1004 1004
                  const Edge& prev = INVALID) const {
1005 1005
      if (!(*_node_filter)[u] || !(*_node_filter)[v]) {
1006 1006
        return INVALID;
1007 1007
      }
1008 1008
      Edge edge = Parent::findEdge(u, v, prev);
1009 1009
      while (edge != INVALID && !(*_edge_filter)[edge]) {
1010 1010
        edge = Parent::findEdge(u, v, edge);
1011 1011
      }
1012 1012
      return edge;
1013 1013
    }
1014 1014

	
1015 1015
    template <typename V>
1016 1016
    class NodeMap 
1017 1017
      : public SubMapExtender<SubGraphBase<GR, NF, EF, ch>,
1018 1018
          LEMON_SCOPE_FIX(GraphAdaptorBase<GR>, NodeMap<V>)> {
1019 1019
    public:
1020 1020
      typedef V Value;
1021 1021
      typedef SubMapExtender<SubGraphBase<GR, NF, EF, ch>, 
1022 1022
        LEMON_SCOPE_FIX(GraphAdaptorBase<GR>, NodeMap<V>)> Parent;
1023 1023

	
1024 1024
      NodeMap(const SubGraphBase<GR, NF, EF, ch>& adaptor)
1025 1025
        : Parent(adaptor) {}
1026 1026
      NodeMap(const SubGraphBase<GR, NF, EF, ch>& adaptor, const V& value)
1027 1027
        : Parent(adaptor, value) {}
1028 1028

	
1029 1029
    private:
1030 1030
      NodeMap& operator=(const NodeMap& cmap) {
1031 1031
        return operator=<NodeMap>(cmap);
1032 1032
      }
1033 1033

	
1034 1034
      template <typename CMap>
1035 1035
      NodeMap& operator=(const CMap& cmap) {
1036 1036
        Parent::operator=(cmap);
1037 1037
        return *this;
1038 1038
      }
1039 1039
    };
1040 1040

	
1041 1041
    template <typename V>
1042 1042
    class ArcMap 
1043 1043
      : public SubMapExtender<SubGraphBase<GR, NF, EF, ch>,
1044 1044
          LEMON_SCOPE_FIX(GraphAdaptorBase<GR>, ArcMap<V>)> {
1045 1045
    public:
1046 1046
      typedef V Value;
1047 1047
      typedef SubMapExtender<SubGraphBase<GR, NF, EF, ch>, 
1048 1048
        LEMON_SCOPE_FIX(GraphAdaptorBase<GR>, ArcMap<V>)> Parent;
1049 1049

	
1050 1050
      ArcMap(const SubGraphBase<GR, NF, EF, ch>& adaptor)
1051 1051
        : Parent(adaptor) {}
1052 1052
      ArcMap(const SubGraphBase<GR, NF, EF, ch>& adaptor, const V& value)
1053 1053
        : Parent(adaptor, value) {}
1054 1054

	
1055 1055
    private:
1056 1056
      ArcMap& operator=(const ArcMap& cmap) {
1057 1057
        return operator=<ArcMap>(cmap);
1058 1058
      }
1059 1059

	
1060 1060
      template <typename CMap>
1061 1061
      ArcMap& operator=(const CMap& cmap) {
1062 1062
        Parent::operator=(cmap);
1063 1063
        return *this;
1064 1064
      }
1065 1065
    };
1066 1066

	
1067 1067
    template <typename V>
1068 1068
    class EdgeMap 
1069 1069
      : public SubMapExtender<SubGraphBase<GR, NF, EF, ch>,
1070 1070
        LEMON_SCOPE_FIX(GraphAdaptorBase<GR>, EdgeMap<V>)> {
1071 1071
    public:
1072 1072
      typedef V Value;
1073 1073
      typedef SubMapExtender<SubGraphBase<GR, NF, EF, ch>, 
1074 1074
        LEMON_SCOPE_FIX(GraphAdaptorBase<GR>, EdgeMap<V>)> Parent;
1075 1075

	
1076 1076
      EdgeMap(const SubGraphBase<GR, NF, EF, ch>& adaptor)
1077 1077
        : Parent(adaptor) {}
1078 1078

	
1079 1079
      EdgeMap(const SubGraphBase<GR, NF, EF, ch>& adaptor, const V& value)
1080 1080
        : Parent(adaptor, value) {}
1081 1081

	
1082 1082
    private:
1083 1083
      EdgeMap& operator=(const EdgeMap& cmap) {
1084 1084
        return operator=<EdgeMap>(cmap);
1085 1085
      }
1086 1086

	
1087 1087
      template <typename CMap>
1088 1088
      EdgeMap& operator=(const CMap& cmap) {
1089 1089
        Parent::operator=(cmap);
1090 1090
        return *this;
1091 1091
      }
1092 1092
    };
1093 1093

	
1094 1094
  };
1095 1095

	
1096 1096
  template <typename GR, typename NF, typename EF>
1097 1097
  class SubGraphBase<GR, NF, EF, false>
1098 1098
    : public GraphAdaptorBase<GR> {
1099 1099
  public:
1100 1100
    typedef GR Graph;
1101 1101
    typedef NF NodeFilterMap;
1102 1102
    typedef EF EdgeFilterMap;
1103 1103

	
1104 1104
    typedef SubGraphBase Adaptor;
1105 1105
    typedef GraphAdaptorBase<GR> Parent;
1106 1106
  protected:
1107 1107
    NF* _node_filter;
1108 1108
    EF* _edge_filter;
1109 1109
    SubGraphBase() 
1110 1110
	  : Parent(), _node_filter(0), _edge_filter(0) { }
1111 1111

	
1112 1112
    void initialize(GR& graph, NF& node_filter, EF& edge_filter) {
1113 1113
      Parent::initialize(graph);
1114 1114
      _node_filter = &node_filter;
1115 1115
      _edge_filter = &edge_filter;
1116 1116
    }
1117 1117

	
1118 1118
  public:
1119 1119

	
1120 1120
    typedef typename Parent::Node Node;
1121 1121
    typedef typename Parent::Arc Arc;
1122 1122
    typedef typename Parent::Edge Edge;
1123 1123

	
1124 1124
    void first(Node& i) const {
1125 1125
      Parent::first(i);
1126 1126
      while (i!=INVALID && !(*_node_filter)[i]) Parent::next(i);
1127 1127
    }
1128 1128

	
1129 1129
    void first(Arc& i) const {
1130 1130
      Parent::first(i);
1131 1131
      while (i!=INVALID && !(*_edge_filter)[i]) Parent::next(i);
1132 1132
    }
1133 1133

	
1134 1134
    void first(Edge& i) const {
1135 1135
      Parent::first(i);
1136 1136
      while (i!=INVALID && !(*_edge_filter)[i]) Parent::next(i);
1137 1137
    }
1138 1138

	
1139 1139
    void firstIn(Arc& i, const Node& n) const {
1140 1140
      Parent::firstIn(i, n);
1141 1141
      while (i!=INVALID && !(*_edge_filter)[i]) Parent::nextIn(i);
1142 1142
    }
1143 1143

	
1144 1144
    void firstOut(Arc& i, const Node& n) const {
1145 1145
      Parent::firstOut(i, n);
1146 1146
      while (i!=INVALID && !(*_edge_filter)[i]) Parent::nextOut(i);
1147 1147
    }
1148 1148

	
1149 1149
    void firstInc(Edge& i, bool& d, const Node& n) const {
1150 1150
      Parent::firstInc(i, d, n);
1151 1151
      while (i!=INVALID && !(*_edge_filter)[i]) Parent::nextInc(i, d);
1152 1152
    }
1153 1153

	
1154 1154
    void next(Node& i) const {
1155 1155
      Parent::next(i);
1156 1156
      while (i!=INVALID && !(*_node_filter)[i]) Parent::next(i);
1157 1157
    }
1158 1158
    void next(Arc& i) const {
1159 1159
      Parent::next(i);
1160 1160
      while (i!=INVALID && !(*_edge_filter)[i]) Parent::next(i);
1161 1161
    }
1162 1162
    void next(Edge& i) const {
1163 1163
      Parent::next(i);
1164 1164
      while (i!=INVALID && !(*_edge_filter)[i]) Parent::next(i);
1165 1165
    }
1166 1166
    void nextIn(Arc& i) const {
1167 1167
      Parent::nextIn(i);
1168 1168
      while (i!=INVALID && !(*_edge_filter)[i]) Parent::nextIn(i);
1169 1169
    }
1170 1170

	
1171 1171
    void nextOut(Arc& i) const {
1172 1172
      Parent::nextOut(i);
1173 1173
      while (i!=INVALID && !(*_edge_filter)[i]) Parent::nextOut(i);
1174 1174
    }
1175 1175
    void nextInc(Edge& i, bool& d) const {
1176 1176
      Parent::nextInc(i, d);
1177 1177
      while (i!=INVALID && !(*_edge_filter)[i]) Parent::nextInc(i, d);
1178 1178
    }
1179 1179

	
1180 1180
    void status(const Node& n, bool v) const { _node_filter->set(n, v); }
1181 1181
    void status(const Edge& e, bool v) const { _edge_filter->set(e, v); }
1182 1182

	
1183 1183
    bool status(const Node& n) const { return (*_node_filter)[n]; }
1184 1184
    bool status(const Edge& e) const { return (*_edge_filter)[e]; }
1185 1185

	
1186 1186
    typedef False NodeNumTag;
1187 1187
    typedef False ArcNumTag;
1188 1188
    typedef False EdgeNumTag;
1189 1189

	
1190 1190
    typedef FindArcTagIndicator<Graph> FindArcTag;
1191 1191
    Arc findArc(const Node& u, const Node& v,
1192 1192
                const Arc& prev = INVALID) const {
1193 1193
      Arc arc = Parent::findArc(u, v, prev);
1194 1194
      while (arc != INVALID && !(*_edge_filter)[arc]) {
1195 1195
        arc = Parent::findArc(u, v, arc);
1196 1196
      }
1197 1197
      return arc;
1198 1198
    }
1199 1199

	
1200 1200
    typedef FindEdgeTagIndicator<Graph> FindEdgeTag;
1201 1201
    Edge findEdge(const Node& u, const Node& v,
1202 1202
                  const Edge& prev = INVALID) const {
1203 1203
      Edge edge = Parent::findEdge(u, v, prev);
1204 1204
      while (edge != INVALID && !(*_edge_filter)[edge]) {
1205 1205
        edge = Parent::findEdge(u, v, edge);
1206 1206
      }
1207 1207
      return edge;
1208 1208
    }
1209 1209

	
1210 1210
    template <typename V>
1211 1211
    class NodeMap 
1212 1212
      : public SubMapExtender<SubGraphBase<GR, NF, EF, false>,
1213 1213
          LEMON_SCOPE_FIX(GraphAdaptorBase<GR>, NodeMap<V>)> {
1214 1214
    public:
1215 1215
      typedef V Value;
1216 1216
      typedef SubMapExtender<SubGraphBase<GR, NF, EF, false>, 
1217 1217
        LEMON_SCOPE_FIX(GraphAdaptorBase<GR>, NodeMap<V>)> Parent;
1218 1218

	
1219 1219
      NodeMap(const SubGraphBase<GR, NF, EF, false>& adaptor)
1220 1220
        : Parent(adaptor) {}
1221 1221
      NodeMap(const SubGraphBase<GR, NF, EF, false>& adaptor, const V& value)
1222 1222
        : Parent(adaptor, value) {}
1223 1223

	
1224 1224
    private:
1225 1225
      NodeMap& operator=(const NodeMap& cmap) {
1226 1226
        return operator=<NodeMap>(cmap);
1227 1227
      }
1228 1228

	
1229 1229
      template <typename CMap>
1230 1230
      NodeMap& operator=(const CMap& cmap) {
1231 1231
        Parent::operator=(cmap);
1232 1232
        return *this;
1233 1233
      }
1234 1234
    };
1235 1235

	
1236 1236
    template <typename V>
1237 1237
    class ArcMap 
1238 1238
      : public SubMapExtender<SubGraphBase<GR, NF, EF, false>,
1239 1239
          LEMON_SCOPE_FIX(GraphAdaptorBase<GR>, ArcMap<V>)> {
1240 1240
    public:
1241 1241
      typedef V Value;
1242 1242
      typedef SubMapExtender<SubGraphBase<GR, NF, EF, false>, 
1243 1243
        LEMON_SCOPE_FIX(GraphAdaptorBase<GR>, ArcMap<V>)> Parent;
1244 1244

	
1245 1245
      ArcMap(const SubGraphBase<GR, NF, EF, false>& adaptor)
1246 1246
        : Parent(adaptor) {}
1247 1247
      ArcMap(const SubGraphBase<GR, NF, EF, false>& adaptor, const V& value)
1248 1248
        : Parent(adaptor, value) {}
1249 1249

	
1250 1250
    private:
1251 1251
      ArcMap& operator=(const ArcMap& cmap) {
1252 1252
        return operator=<ArcMap>(cmap);
1253 1253
      }
1254 1254

	
1255 1255
      template <typename CMap>
1256 1256
      ArcMap& operator=(const CMap& cmap) {
1257 1257
        Parent::operator=(cmap);
1258 1258
        return *this;
1259 1259
      }
1260 1260
    };
1261 1261

	
1262 1262
    template <typename V>
1263 1263
    class EdgeMap 
1264 1264
      : public SubMapExtender<SubGraphBase<GR, NF, EF, false>,
1265 1265
        LEMON_SCOPE_FIX(GraphAdaptorBase<GR>, EdgeMap<V>)> {
1266 1266
    public:
1267 1267
      typedef V Value;
1268 1268
      typedef SubMapExtender<SubGraphBase<GR, NF, EF, false>, 
1269 1269
		  LEMON_SCOPE_FIX(GraphAdaptorBase<GR>, EdgeMap<V>)> Parent;
1270 1270

	
1271 1271
      EdgeMap(const SubGraphBase<GR, NF, EF, false>& adaptor)
1272 1272
        : Parent(adaptor) {}
1273 1273

	
1274 1274
      EdgeMap(const SubGraphBase<GR, NF, EF, false>& adaptor, const V& value)
1275 1275
        : Parent(adaptor, value) {}
1276 1276

	
1277 1277
    private:
1278 1278
      EdgeMap& operator=(const EdgeMap& cmap) {
1279 1279
        return operator=<EdgeMap>(cmap);
1280 1280
      }
1281 1281

	
1282 1282
      template <typename CMap>
1283 1283
      EdgeMap& operator=(const CMap& cmap) {
1284 1284
        Parent::operator=(cmap);
1285 1285
        return *this;
1286 1286
      }
1287 1287
    };
1288 1288

	
1289 1289
  };
1290 1290

	
1291 1291
  /// \ingroup graph_adaptors
1292 1292
  ///
1293 1293
  /// \brief Adaptor class for hiding nodes and edges in an undirected
1294 1294
  /// graph.
1295 1295
  ///
1296 1296
  /// SubGraph can be used for hiding nodes and edges in a graph.
1297 1297
  /// A \c bool node map and a \c bool edge map must be specified, which
1298 1298
  /// define the filters for nodes and edges.
1299 1299
  /// Only the nodes and edges with \c true filter value are
1300 1300
  /// shown in the subgraph. The edges that are incident to hidden
1301 1301
  /// nodes are also filtered out.
1302 1302
  /// This adaptor conforms to the \ref concepts::Graph "Graph" concept.
1303 1303
  ///
1304 1304
  /// The adapted graph can also be modified through this adaptor
1305 1305
  /// by adding or removing nodes or edges, unless the \c GR template
1306 1306
  /// parameter is set to be \c const.
1307 1307
  ///
1308 1308
  /// \tparam GR The type of the adapted graph.
1309 1309
  /// It must conform to the \ref concepts::Graph "Graph" concept.
1310 1310
  /// It can also be specified to be \c const.
1311 1311
  /// \tparam NF The type of the node filter map.
1312 1312
  /// It must be a \c bool (or convertible) node map of the
1313 1313
  /// adapted graph. The default type is
1314 1314
  /// \ref concepts::Graph::NodeMap "GR::NodeMap<bool>".
1315 1315
  /// \tparam EF The type of the edge filter map.
1316 1316
  /// It must be a \c bool (or convertible) edge map of the
1317 1317
  /// adapted graph. The default type is
1318 1318
  /// \ref concepts::Graph::EdgeMap "GR::EdgeMap<bool>".
1319 1319
  ///
1320 1320
  /// \note The \c Node, \c Edge and \c Arc types of this adaptor and the
1321 1321
  /// adapted graph are convertible to each other.
1322 1322
  ///
1323 1323
  /// \see FilterNodes
1324 1324
  /// \see FilterEdges
1325 1325
#ifdef DOXYGEN
1326 1326
  template<typename GR, typename NF, typename EF>
1327 1327
  class SubGraph {
1328 1328
#else
1329 1329
  template<typename GR,
1330 1330
           typename NF = typename GR::template NodeMap<bool>,
1331 1331
           typename EF = typename GR::template EdgeMap<bool> >
1332 1332
  class SubGraph :
1333 1333
    public GraphAdaptorExtender<SubGraphBase<GR, NF, EF, true> > {
1334 1334
#endif
1335 1335
  public:
1336 1336
    /// The type of the adapted graph.
1337 1337
    typedef GR Graph;
1338 1338
    /// The type of the node filter map.
1339 1339
    typedef NF NodeFilterMap;
1340 1340
    /// The type of the edge filter map.
1341 1341
    typedef EF EdgeFilterMap;
1342 1342

	
1343 1343
    typedef GraphAdaptorExtender<SubGraphBase<GR, NF, EF, true> >
1344 1344
      Parent;
1345 1345

	
1346 1346
    typedef typename Parent::Node Node;
1347 1347
    typedef typename Parent::Edge Edge;
1348 1348

	
1349 1349
  protected:
1350 1350
    SubGraph() { }
1351 1351
  public:
1352 1352

	
1353 1353
    /// \brief Constructor
1354 1354
    ///
1355 1355
    /// Creates a subgraph for the given graph with the given node
1356 1356
    /// and edge filter maps.
1357 1357
    SubGraph(GR& graph, NF& node_filter, EF& edge_filter) {
1358 1358
      initialize(graph, node_filter, edge_filter);
1359 1359
    }
1360 1360

	
1361 1361
    /// \brief Sets the status of the given node
1362 1362
    ///
1363 1363
    /// This function sets the status of the given node.
1364 1364
    /// It is done by simply setting the assigned value of \c n
1365 1365
    /// to \c v in the node filter map.
1366 1366
    void status(const Node& n, bool v) const { Parent::status(n, v); }
1367 1367

	
1368 1368
    /// \brief Sets the status of the given edge
1369 1369
    ///
1370 1370
    /// This function sets the status of the given edge.
1371 1371
    /// It is done by simply setting the assigned value of \c e
1372 1372
    /// to \c v in the edge filter map.
1373 1373
    void status(const Edge& e, bool v) const { Parent::status(e, v); }
1374 1374

	
1375 1375
    /// \brief Returns the status of the given node
1376 1376
    ///
1377 1377
    /// This function returns the status of the given node.
1378 1378
    /// It is \c true if the given node is enabled (i.e. not hidden).
1379 1379
    bool status(const Node& n) const { return Parent::status(n); }
1380 1380

	
1381 1381
    /// \brief Returns the status of the given edge
1382 1382
    ///
1383 1383
    /// This function returns the status of the given edge.
1384 1384
    /// It is \c true if the given edge is enabled (i.e. not hidden).
1385 1385
    bool status(const Edge& e) const { return Parent::status(e); }
1386 1386

	
1387 1387
    /// \brief Disables the given node
1388 1388
    ///
1389 1389
    /// This function disables the given node in the subdigraph,
1390 1390
    /// so the iteration jumps over it.
1391 1391
    /// It is the same as \ref status() "status(n, false)".
1392 1392
    void disable(const Node& n) const { Parent::status(n, false); }
1393 1393

	
1394 1394
    /// \brief Disables the given edge
1395 1395
    ///
1396 1396
    /// This function disables the given edge in the subgraph,
1397 1397
    /// so the iteration jumps over it.
1398 1398
    /// It is the same as \ref status() "status(e, false)".
1399 1399
    void disable(const Edge& e) const { Parent::status(e, false); }
1400 1400

	
1401 1401
    /// \brief Enables the given node
1402 1402
    ///
1403 1403
    /// This function enables the given node in the subdigraph.
1404 1404
    /// It is the same as \ref status() "status(n, true)".
1405 1405
    void enable(const Node& n) const { Parent::status(n, true); }
1406 1406

	
1407 1407
    /// \brief Enables the given edge
1408 1408
    ///
1409 1409
    /// This function enables the given edge in the subgraph.
1410 1410
    /// It is the same as \ref status() "status(e, true)".
1411 1411
    void enable(const Edge& e) const { Parent::status(e, true); }
1412 1412

	
1413 1413
  };
1414 1414

	
1415 1415
  /// \brief Returns a read-only SubGraph adaptor
1416 1416
  ///
1417 1417
  /// This function just returns a read-only \ref SubGraph adaptor.
1418 1418
  /// \ingroup graph_adaptors
1419 1419
  /// \relates SubGraph
1420 1420
  template<typename GR, typename NF, typename EF>
1421 1421
  SubGraph<const GR, NF, EF>
1422 1422
  subGraph(const GR& graph, NF& node_filter, EF& edge_filter) {
1423 1423
    return SubGraph<const GR, NF, EF>
1424 1424
      (graph, node_filter, edge_filter);
1425 1425
  }
1426 1426

	
1427 1427
  template<typename GR, typename NF, typename EF>
1428 1428
  SubGraph<const GR, const NF, EF>
1429 1429
  subGraph(const GR& graph, const NF& node_filter, EF& edge_filter) {
1430 1430
    return SubGraph<const GR, const NF, EF>
1431 1431
      (graph, node_filter, edge_filter);
1432 1432
  }
1433 1433

	
1434 1434
  template<typename GR, typename NF, typename EF>
1435 1435
  SubGraph<const GR, NF, const EF>
1436 1436
  subGraph(const GR& graph, NF& node_filter, const EF& edge_filter) {
1437 1437
    return SubGraph<const GR, NF, const EF>
1438 1438
      (graph, node_filter, edge_filter);
1439 1439
  }
1440 1440

	
1441 1441
  template<typename GR, typename NF, typename EF>
1442 1442
  SubGraph<const GR, const NF, const EF>
1443 1443
  subGraph(const GR& graph, const NF& node_filter, const EF& edge_filter) {
1444 1444
    return SubGraph<const GR, const NF, const EF>
1445 1445
      (graph, node_filter, edge_filter);
1446 1446
  }
1447 1447

	
1448 1448

	
1449 1449
  /// \ingroup graph_adaptors
1450 1450
  ///
1451 1451
  /// \brief Adaptor class for hiding nodes in a digraph or a graph.
1452 1452
  ///
1453 1453
  /// FilterNodes adaptor can be used for hiding nodes in a digraph or a
1454 1454
  /// graph. A \c bool node map must be specified, which defines the filter
1455 1455
  /// for the nodes. Only the nodes with \c true filter value and the
1456 1456
  /// arcs/edges incident to nodes both with \c true filter value are shown
1457 1457
  /// in the subgraph. This adaptor conforms to the \ref concepts::Digraph
1458 1458
  /// "Digraph" concept or the \ref concepts::Graph "Graph" concept
1459 1459
  /// depending on the \c GR template parameter.
1460 1460
  ///
1461 1461
  /// The adapted (di)graph can also be modified through this adaptor
1462 1462
  /// by adding or removing nodes or arcs/edges, unless the \c GR template
1463 1463
  /// parameter is set to be \c const.
1464 1464
  ///
1465 1465
  /// \tparam GR The type of the adapted digraph or graph.
1466 1466
  /// It must conform to the \ref concepts::Digraph "Digraph" concept
1467 1467
  /// or the \ref concepts::Graph "Graph" concept.
1468 1468
  /// It can also be specified to be \c const.
1469 1469
  /// \tparam NF The type of the node filter map.
1470 1470
  /// It must be a \c bool (or convertible) node map of the
1471 1471
  /// adapted (di)graph. The default type is
1472 1472
  /// \ref concepts::Graph::NodeMap "GR::NodeMap<bool>".
1473 1473
  ///
1474 1474
  /// \note The \c Node and <tt>Arc/Edge</tt> types of this adaptor and the
1475 1475
  /// adapted (di)graph are convertible to each other.
1476 1476
#ifdef DOXYGEN
1477 1477
  template<typename GR, typename NF>
1478 1478
  class FilterNodes {
1479 1479
#else
1480 1480
  template<typename GR,
1481 1481
           typename NF = typename GR::template NodeMap<bool>,
1482 1482
           typename Enable = void>
1483 1483
  class FilterNodes :
1484 1484
    public DigraphAdaptorExtender<
1485 1485
      SubDigraphBase<GR, NF, ConstMap<typename GR::Arc, Const<bool, true> >,
1486 1486
                     true> > {
1487 1487
#endif
1488 1488
  public:
1489 1489

	
1490 1490
    typedef GR Digraph;
1491 1491
    typedef NF NodeFilterMap;
1492 1492

	
1493 1493
    typedef DigraphAdaptorExtender<
1494 1494
      SubDigraphBase<GR, NF, ConstMap<typename GR::Arc, Const<bool, true> >, 
1495 1495
                     true> > Parent;
1496 1496

	
1497 1497
    typedef typename Parent::Node Node;
1498 1498

	
1499 1499
  protected:
1500 1500
    ConstMap<typename Digraph::Arc, Const<bool, true> > const_true_map;
1501 1501

	
1502 1502
    FilterNodes() : const_true_map() {}
1503 1503

	
1504 1504
  public:
1505 1505

	
1506 1506
    /// \brief Constructor
1507 1507
    ///
1508 1508
    /// Creates a subgraph for the given digraph or graph with the
1509 1509
    /// given node filter map.
1510 1510
    FilterNodes(GR& graph, NF& node_filter) 
1511 1511
      : Parent(), const_true_map()
1512 1512
    {
1513 1513
      Parent::initialize(graph, node_filter, const_true_map);
1514 1514
    }
1515 1515

	
1516 1516
    /// \brief Sets the status of the given node
1517 1517
    ///
1518 1518
    /// This function sets the status of the given node.
1519 1519
    /// It is done by simply setting the assigned value of \c n
1520 1520
    /// to \c v in the node filter map.
1521 1521
    void status(const Node& n, bool v) const { Parent::status(n, v); }
1522 1522

	
1523 1523
    /// \brief Returns the status of the given node
1524 1524
    ///
1525 1525
    /// This function returns the status of the given node.
1526 1526
    /// It is \c true if the given node is enabled (i.e. not hidden).
1527 1527
    bool status(const Node& n) const { return Parent::status(n); }
1528 1528

	
1529 1529
    /// \brief Disables the given node
1530 1530
    ///
1531 1531
    /// This function disables the given node, so the iteration
1532 1532
    /// jumps over it.
1533 1533
    /// It is the same as \ref status() "status(n, false)".
1534 1534
    void disable(const Node& n) const { Parent::status(n, false); }
1535 1535

	
1536 1536
    /// \brief Enables the given node
1537 1537
    ///
1538 1538
    /// This function enables the given node.
1539 1539
    /// It is the same as \ref status() "status(n, true)".
1540 1540
    void enable(const Node& n) const { Parent::status(n, true); }
1541 1541

	
1542 1542
  };
1543 1543

	
1544 1544
  template<typename GR, typename NF>
1545 1545
  class FilterNodes<GR, NF,
1546 1546
                    typename enable_if<UndirectedTagIndicator<GR> >::type> :
1547 1547
    public GraphAdaptorExtender<
1548 1548
      SubGraphBase<GR, NF, ConstMap<typename GR::Edge, Const<bool, true> >, 
1549 1549
                   true> > {
1550 1550

	
1551 1551
  public:
1552 1552
    typedef GR Graph;
1553 1553
    typedef NF NodeFilterMap;
1554 1554
    typedef GraphAdaptorExtender<
1555 1555
      SubGraphBase<GR, NF, ConstMap<typename GR::Edge, Const<bool, true> >, 
1556 1556
                   true> > Parent;
1557 1557

	
1558 1558
    typedef typename Parent::Node Node;
1559 1559
  protected:
1560 1560
    ConstMap<typename GR::Edge, Const<bool, true> > const_true_map;
1561 1561

	
1562 1562
    FilterNodes() : const_true_map() {}
1563 1563

	
1564 1564
  public:
1565 1565

	
1566 1566
    FilterNodes(GR& graph, NodeFilterMap& node_filter) :
1567 1567
      Parent(), const_true_map() {
1568 1568
      Parent::initialize(graph, node_filter, const_true_map);
1569 1569
    }
1570 1570

	
1571 1571
    void status(const Node& n, bool v) const { Parent::status(n, v); }
1572 1572
    bool status(const Node& n) const { return Parent::status(n); }
1573 1573
    void disable(const Node& n) const { Parent::status(n, false); }
1574 1574
    void enable(const Node& n) const { Parent::status(n, true); }
1575 1575

	
1576 1576
  };
1577 1577

	
1578 1578

	
1579 1579
  /// \brief Returns a read-only FilterNodes adaptor
1580 1580
  ///
1581 1581
  /// This function just returns a read-only \ref FilterNodes adaptor.
1582 1582
  /// \ingroup graph_adaptors
1583 1583
  /// \relates FilterNodes
1584 1584
  template<typename GR, typename NF>
1585 1585
  FilterNodes<const GR, NF>
1586 1586
  filterNodes(const GR& graph, NF& node_filter) {
1587 1587
    return FilterNodes<const GR, NF>(graph, node_filter);
1588 1588
  }
1589 1589

	
1590 1590
  template<typename GR, typename NF>
1591 1591
  FilterNodes<const GR, const NF>
1592 1592
  filterNodes(const GR& graph, const NF& node_filter) {
1593 1593
    return FilterNodes<const GR, const NF>(graph, node_filter);
1594 1594
  }
1595 1595

	
1596 1596
  /// \ingroup graph_adaptors
1597 1597
  ///
1598 1598
  /// \brief Adaptor class for hiding arcs in a digraph.
1599 1599
  ///
1600 1600
  /// FilterArcs adaptor can be used for hiding arcs in a digraph.
1601 1601
  /// A \c bool arc map must be specified, which defines the filter for
1602 1602
  /// the arcs. Only the arcs with \c true filter value are shown in the
1603 1603
  /// subdigraph. This adaptor conforms to the \ref concepts::Digraph
1604 1604
  /// "Digraph" concept.
1605 1605
  ///
1606 1606
  /// The adapted digraph can also be modified through this adaptor
1607 1607
  /// by adding or removing nodes or arcs, unless the \c GR template
1608 1608
  /// parameter is set to be \c const.
1609 1609
  ///
1610 1610
  /// \tparam DGR The type of the adapted digraph.
1611 1611
  /// It must conform to the \ref concepts::Digraph "Digraph" concept.
1612 1612
  /// It can also be specified to be \c const.
1613 1613
  /// \tparam AF The type of the arc filter map.
1614 1614
  /// It must be a \c bool (or convertible) arc map of the
1615 1615
  /// adapted digraph. The default type is
1616 1616
  /// \ref concepts::Digraph::ArcMap "DGR::ArcMap<bool>".
1617 1617
  ///
1618 1618
  /// \note The \c Node and \c Arc types of this adaptor and the adapted
1619 1619
  /// digraph are convertible to each other.
1620 1620
#ifdef DOXYGEN
1621 1621
  template<typename DGR,
1622 1622
           typename AF>
1623 1623
  class FilterArcs {
1624 1624
#else
1625 1625
  template<typename DGR,
1626 1626
           typename AF = typename DGR::template ArcMap<bool> >
1627 1627
  class FilterArcs :
1628 1628
    public DigraphAdaptorExtender<
1629 1629
      SubDigraphBase<DGR, ConstMap<typename DGR::Node, Const<bool, true> >,
1630 1630
                     AF, false> > {
1631 1631
#endif
1632 1632
  public:
1633 1633
    /// The type of the adapted digraph.
1634 1634
    typedef DGR Digraph;
1635 1635
    /// The type of the arc filter map.
1636 1636
    typedef AF ArcFilterMap;
1637 1637

	
1638 1638
    typedef DigraphAdaptorExtender<
1639 1639
      SubDigraphBase<DGR, ConstMap<typename DGR::Node, Const<bool, true> >, 
1640 1640
                     AF, false> > Parent;
1641 1641

	
1642 1642
    typedef typename Parent::Arc Arc;
1643 1643

	
1644 1644
  protected:
1645 1645
    ConstMap<typename DGR::Node, Const<bool, true> > const_true_map;
1646 1646

	
1647 1647
    FilterArcs() : const_true_map() {}
1648 1648

	
1649 1649
  public:
1650 1650

	
1651 1651
    /// \brief Constructor
1652 1652
    ///
1653 1653
    /// Creates a subdigraph for the given digraph with the given arc
1654 1654
    /// filter map.
1655 1655
    FilterArcs(DGR& digraph, ArcFilterMap& arc_filter)
1656 1656
      : Parent(), const_true_map() {
1657 1657
      Parent::initialize(digraph, const_true_map, arc_filter);
1658 1658
    }
1659 1659

	
1660 1660
    /// \brief Sets the status of the given arc
1661 1661
    ///
1662 1662
    /// This function sets the status of the given arc.
1663 1663
    /// It is done by simply setting the assigned value of \c a
1664 1664
    /// to \c v in the arc filter map.
1665 1665
    void status(const Arc& a, bool v) const { Parent::status(a, v); }
1666 1666

	
1667 1667
    /// \brief Returns the status of the given arc
1668 1668
    ///
1669 1669
    /// This function returns the status of the given arc.
1670 1670
    /// It is \c true if the given arc is enabled (i.e. not hidden).
1671 1671
    bool status(const Arc& a) const { return Parent::status(a); }
1672 1672

	
1673 1673
    /// \brief Disables the given arc
1674 1674
    ///
1675 1675
    /// This function disables the given arc in the subdigraph,
1676 1676
    /// so the iteration jumps over it.
1677 1677
    /// It is the same as \ref status() "status(a, false)".
1678 1678
    void disable(const Arc& a) const { Parent::status(a, false); }
1679 1679

	
1680 1680
    /// \brief Enables the given arc
1681 1681
    ///
1682 1682
    /// This function enables the given arc in the subdigraph.
1683 1683
    /// It is the same as \ref status() "status(a, true)".
1684 1684
    void enable(const Arc& a) const { Parent::status(a, true); }
1685 1685

	
1686 1686
  };
1687 1687

	
1688 1688
  /// \brief Returns a read-only FilterArcs adaptor
1689 1689
  ///
1690 1690
  /// This function just returns a read-only \ref FilterArcs adaptor.
1691 1691
  /// \ingroup graph_adaptors
1692 1692
  /// \relates FilterArcs
1693 1693
  template<typename DGR, typename AF>
1694 1694
  FilterArcs<const DGR, AF>
1695 1695
  filterArcs(const DGR& digraph, AF& arc_filter) {
1696 1696
    return FilterArcs<const DGR, AF>(digraph, arc_filter);
1697 1697
  }
1698 1698

	
1699 1699
  template<typename DGR, typename AF>
1700 1700
  FilterArcs<const DGR, const AF>
1701 1701
  filterArcs(const DGR& digraph, const AF& arc_filter) {
1702 1702
    return FilterArcs<const DGR, const AF>(digraph, arc_filter);
1703 1703
  }
1704 1704

	
1705 1705
  /// \ingroup graph_adaptors
1706 1706
  ///
1707 1707
  /// \brief Adaptor class for hiding edges in a graph.
1708 1708
  ///
1709 1709
  /// FilterEdges adaptor can be used for hiding edges in a graph.
1710 1710
  /// A \c bool edge map must be specified, which defines the filter for
1711 1711
  /// the edges. Only the edges with \c true filter value are shown in the
1712 1712
  /// subgraph. This adaptor conforms to the \ref concepts::Graph
1713 1713
  /// "Graph" concept.
1714 1714
  ///
1715 1715
  /// The adapted graph can also be modified through this adaptor
1716 1716
  /// by adding or removing nodes or edges, unless the \c GR template
1717 1717
  /// parameter is set to be \c const.
1718 1718
  ///
1719 1719
  /// \tparam GR The type of the adapted graph.
1720 1720
  /// It must conform to the \ref concepts::Graph "Graph" concept.
1721 1721
  /// It can also be specified to be \c const.
1722 1722
  /// \tparam EF The type of the edge filter map.
1723 1723
  /// It must be a \c bool (or convertible) edge map of the
1724 1724
  /// adapted graph. The default type is
1725 1725
  /// \ref concepts::Graph::EdgeMap "GR::EdgeMap<bool>".
1726 1726
  ///
1727 1727
  /// \note The \c Node, \c Edge and \c Arc types of this adaptor and the
1728 1728
  /// adapted graph are convertible to each other.
1729 1729
#ifdef DOXYGEN
1730 1730
  template<typename GR,
1731 1731
           typename EF>
1732 1732
  class FilterEdges {
1733 1733
#else
1734 1734
  template<typename GR,
1735 1735
           typename EF = typename GR::template EdgeMap<bool> >
1736 1736
  class FilterEdges :
1737 1737
    public GraphAdaptorExtender<
1738 1738
      SubGraphBase<GR, ConstMap<typename GR::Node, Const<bool, true> >, 
1739 1739
                   EF, false> > {
1740 1740
#endif
1741 1741
  public:
1742 1742
    /// The type of the adapted graph.
1743 1743
    typedef GR Graph;
1744 1744
    /// The type of the edge filter map.
1745 1745
    typedef EF EdgeFilterMap;
1746 1746

	
1747 1747
    typedef GraphAdaptorExtender<
1748 1748
      SubGraphBase<GR, ConstMap<typename GR::Node, Const<bool, true > >, 
1749 1749
                   EF, false> > Parent;
1750 1750

	
1751 1751
    typedef typename Parent::Edge Edge;
1752 1752

	
1753 1753
  protected:
1754 1754
    ConstMap<typename GR::Node, Const<bool, true> > const_true_map;
1755 1755

	
1756 1756
    FilterEdges() : const_true_map(true) {
1757 1757
      Parent::setNodeFilterMap(const_true_map);
1758 1758
    }
1759 1759

	
1760 1760
  public:
1761 1761

	
1762 1762
    /// \brief Constructor
1763 1763
    ///
1764 1764
    /// Creates a subgraph for the given graph with the given edge
1765 1765
    /// filter map.
1766 1766
    FilterEdges(GR& graph, EF& edge_filter) 
1767 1767
      : Parent(), const_true_map() {
1768 1768
      Parent::initialize(graph, const_true_map, edge_filter);
1769 1769
    }
1770 1770

	
1771 1771
    /// \brief Sets the status of the given edge
1772 1772
    ///
1773 1773
    /// This function sets the status of the given edge.
1774 1774
    /// It is done by simply setting the assigned value of \c e
1775 1775
    /// to \c v in the edge filter map.
1776 1776
    void status(const Edge& e, bool v) const { Parent::status(e, v); }
1777 1777

	
1778 1778
    /// \brief Returns the status of the given edge
1779 1779
    ///
1780 1780
    /// This function returns the status of the given edge.
1781 1781
    /// It is \c true if the given edge is enabled (i.e. not hidden).
1782 1782
    bool status(const Edge& e) const { return Parent::status(e); }
1783 1783

	
1784 1784
    /// \brief Disables the given edge
1785 1785
    ///
1786 1786
    /// This function disables the given edge in the subgraph,
1787 1787
    /// so the iteration jumps over it.
1788 1788
    /// It is the same as \ref status() "status(e, false)".
1789 1789
    void disable(const Edge& e) const { Parent::status(e, false); }
1790 1790

	
1791 1791
    /// \brief Enables the given edge
1792 1792
    ///
1793 1793
    /// This function enables the given edge in the subgraph.
1794 1794
    /// It is the same as \ref status() "status(e, true)".
1795 1795
    void enable(const Edge& e) const { Parent::status(e, true); }
1796 1796

	
1797 1797
  };
1798 1798

	
1799 1799
  /// \brief Returns a read-only FilterEdges adaptor
1800 1800
  ///
1801 1801
  /// This function just returns a read-only \ref FilterEdges adaptor.
1802 1802
  /// \ingroup graph_adaptors
1803 1803
  /// \relates FilterEdges
1804 1804
  template<typename GR, typename EF>
1805 1805
  FilterEdges<const GR, EF>
1806 1806
  filterEdges(const GR& graph, EF& edge_filter) {
1807 1807
    return FilterEdges<const GR, EF>(graph, edge_filter);
1808 1808
  }
1809 1809

	
1810 1810
  template<typename GR, typename EF>
1811 1811
  FilterEdges<const GR, const EF>
1812 1812
  filterEdges(const GR& graph, const EF& edge_filter) {
1813 1813
    return FilterEdges<const GR, const EF>(graph, edge_filter);
1814 1814
  }
1815 1815

	
1816 1816

	
1817 1817
  template <typename DGR>
1818 1818
  class UndirectorBase {
1819 1819
  public:
1820 1820
    typedef DGR Digraph;
1821 1821
    typedef UndirectorBase Adaptor;
1822 1822

	
1823 1823
    typedef True UndirectedTag;
1824 1824

	
1825 1825
    typedef typename Digraph::Arc Edge;
1826 1826
    typedef typename Digraph::Node Node;
1827 1827

	
1828 1828
    class Arc : public Edge {
1829 1829
      friend class UndirectorBase;
1830 1830
    protected:
1831 1831
      bool _forward;
1832 1832

	
1833 1833
      Arc(const Edge& edge, bool forward) :
1834 1834
        Edge(edge), _forward(forward) {}
1835 1835

	
1836 1836
    public:
1837 1837
      Arc() {}
1838 1838

	
1839 1839
      Arc(Invalid) : Edge(INVALID), _forward(true) {}
1840 1840

	
1841 1841
      bool operator==(const Arc &other) const {
1842 1842
        return _forward == other._forward &&
1843 1843
          static_cast<const Edge&>(*this) == static_cast<const Edge&>(other);
1844 1844
      }
1845 1845
      bool operator!=(const Arc &other) const {
1846 1846
        return _forward != other._forward ||
1847 1847
          static_cast<const Edge&>(*this) != static_cast<const Edge&>(other);
1848 1848
      }
1849 1849
      bool operator<(const Arc &other) const {
1850 1850
        return _forward < other._forward ||
1851 1851
          (_forward == other._forward &&
1852 1852
           static_cast<const Edge&>(*this) < static_cast<const Edge&>(other));
1853 1853
      }
1854 1854
    };
1855 1855

	
1856 1856
    void first(Node& n) const {
1857 1857
      _digraph->first(n);
1858 1858
    }
1859 1859

	
1860 1860
    void next(Node& n) const {
1861 1861
      _digraph->next(n);
1862 1862
    }
1863 1863

	
1864 1864
    void first(Arc& a) const {
1865 1865
      _digraph->first(a);
1866 1866
      a._forward = true;
1867 1867
    }
1868 1868

	
1869 1869
    void next(Arc& a) const {
1870 1870
      if (a._forward) {
1871 1871
        a._forward = false;
1872 1872
      } else {
1873 1873
        _digraph->next(a);
1874 1874
        a._forward = true;
1875 1875
      }
1876 1876
    }
1877 1877

	
1878 1878
    void first(Edge& e) const {
1879 1879
      _digraph->first(e);
1880 1880
    }
1881 1881

	
1882 1882
    void next(Edge& e) const {
1883 1883
      _digraph->next(e);
1884 1884
    }
1885 1885

	
1886 1886
    void firstOut(Arc& a, const Node& n) const {
1887 1887
      _digraph->firstIn(a, n);
1888 1888
      if( static_cast<const Edge&>(a) != INVALID ) {
1889 1889
        a._forward = false;
1890 1890
      } else {
1891 1891
        _digraph->firstOut(a, n);
1892 1892
        a._forward = true;
1893 1893
      }
1894 1894
    }
1895 1895
    void nextOut(Arc &a) const {
1896 1896
      if (!a._forward) {
1897 1897
        Node n = _digraph->target(a);
1898 1898
        _digraph->nextIn(a);
1899 1899
        if (static_cast<const Edge&>(a) == INVALID ) {
1900 1900
          _digraph->firstOut(a, n);
1901 1901
          a._forward = true;
1902 1902
        }
1903 1903
      }
1904 1904
      else {
1905 1905
        _digraph->nextOut(a);
1906 1906
      }
1907 1907
    }
1908 1908

	
1909 1909
    void firstIn(Arc &a, const Node &n) const {
1910 1910
      _digraph->firstOut(a, n);
1911 1911
      if (static_cast<const Edge&>(a) != INVALID ) {
1912 1912
        a._forward = false;
1913 1913
      } else {
1914 1914
        _digraph->firstIn(a, n);
1915 1915
        a._forward = true;
1916 1916
      }
1917 1917
    }
1918 1918
    void nextIn(Arc &a) const {
1919 1919
      if (!a._forward) {
1920 1920
        Node n = _digraph->source(a);
1921 1921
        _digraph->nextOut(a);
1922 1922
        if( static_cast<const Edge&>(a) == INVALID ) {
1923 1923
          _digraph->firstIn(a, n);
1924 1924
          a._forward = true;
1925 1925
        }
1926 1926
      }
1927 1927
      else {
1928 1928
        _digraph->nextIn(a);
1929 1929
      }
1930 1930
    }
1931 1931

	
1932 1932
    void firstInc(Edge &e, bool &d, const Node &n) const {
1933 1933
      d = true;
1934 1934
      _digraph->firstOut(e, n);
1935 1935
      if (e != INVALID) return;
1936 1936
      d = false;
1937 1937
      _digraph->firstIn(e, n);
1938 1938
    }
1939 1939

	
1940 1940
    void nextInc(Edge &e, bool &d) const {
1941 1941
      if (d) {
1942 1942
        Node s = _digraph->source(e);
1943 1943
        _digraph->nextOut(e);
1944 1944
        if (e != INVALID) return;
1945 1945
        d = false;
1946 1946
        _digraph->firstIn(e, s);
1947 1947
      } else {
1948 1948
        _digraph->nextIn(e);
1949 1949
      }
1950 1950
    }
1951 1951

	
1952 1952
    Node u(const Edge& e) const {
1953 1953
      return _digraph->source(e);
1954 1954
    }
1955 1955

	
1956 1956
    Node v(const Edge& e) const {
1957 1957
      return _digraph->target(e);
1958 1958
    }
1959 1959

	
1960 1960
    Node source(const Arc &a) const {
1961 1961
      return a._forward ? _digraph->source(a) : _digraph->target(a);
1962 1962
    }
1963 1963

	
1964 1964
    Node target(const Arc &a) const {
1965 1965
      return a._forward ? _digraph->target(a) : _digraph->source(a);
1966 1966
    }
1967 1967

	
1968 1968
    static Arc direct(const Edge &e, bool d) {
1969 1969
      return Arc(e, d);
1970 1970
    }
1971 1971
    Arc direct(const Edge &e, const Node& n) const {
1972 1972
      return Arc(e, _digraph->source(e) == n);
1973 1973
    }
1974 1974

	
1975 1975
    static bool direction(const Arc &a) { return a._forward; }
1976 1976

	
1977 1977
    Node nodeFromId(int ix) const { return _digraph->nodeFromId(ix); }
1978 1978
    Arc arcFromId(int ix) const {
1979 1979
      return direct(_digraph->arcFromId(ix >> 1), bool(ix & 1));
1980 1980
    }
1981 1981
    Edge edgeFromId(int ix) const { return _digraph->arcFromId(ix); }
1982 1982

	
1983 1983
    int id(const Node &n) const { return _digraph->id(n); }
1984 1984
    int id(const Arc &a) const {
1985 1985
      return  (_digraph->id(a) << 1) | (a._forward ? 1 : 0);
1986 1986
    }
1987 1987
    int id(const Edge &e) const { return _digraph->id(e); }
1988 1988

	
1989 1989
    int maxNodeId() const { return _digraph->maxNodeId(); }
1990 1990
    int maxArcId() const { return (_digraph->maxArcId() << 1) | 1; }
1991 1991
    int maxEdgeId() const { return _digraph->maxArcId(); }
1992 1992

	
1993 1993
    Node addNode() { return _digraph->addNode(); }
1994 1994
    Edge addEdge(const Node& u, const Node& v) {
1995 1995
      return _digraph->addArc(u, v);
1996 1996
    }
1997 1997

	
1998 1998
    void erase(const Node& i) { _digraph->erase(i); }
1999 1999
    void erase(const Edge& i) { _digraph->erase(i); }
2000 2000

	
2001 2001
    void clear() { _digraph->clear(); }
2002 2002

	
2003 2003
    typedef NodeNumTagIndicator<Digraph> NodeNumTag;
2004 2004
    int nodeNum() const { return _digraph->nodeNum(); }
2005 2005

	
2006 2006
    typedef ArcNumTagIndicator<Digraph> ArcNumTag;
2007 2007
    int arcNum() const { return 2 * _digraph->arcNum(); }
2008 2008

	
2009 2009
    typedef ArcNumTag EdgeNumTag;
2010 2010
    int edgeNum() const { return _digraph->arcNum(); }
2011 2011

	
2012 2012
    typedef FindArcTagIndicator<Digraph> FindArcTag;
2013 2013
    Arc findArc(Node s, Node t, Arc p = INVALID) const {
2014 2014
      if (p == INVALID) {
2015 2015
        Edge arc = _digraph->findArc(s, t);
2016 2016
        if (arc != INVALID) return direct(arc, true);
2017 2017
        arc = _digraph->findArc(t, s);
2018 2018
        if (arc != INVALID) return direct(arc, false);
2019 2019
      } else if (direction(p)) {
2020 2020
        Edge arc = _digraph->findArc(s, t, p);
2021 2021
        if (arc != INVALID) return direct(arc, true);
2022 2022
        arc = _digraph->findArc(t, s);
2023 2023
        if (arc != INVALID) return direct(arc, false);
2024 2024
      } else {
2025 2025
        Edge arc = _digraph->findArc(t, s, p);
2026 2026
        if (arc != INVALID) return direct(arc, false);
2027 2027
      }
2028 2028
      return INVALID;
2029 2029
    }
2030 2030

	
2031 2031
    typedef FindArcTag FindEdgeTag;
2032 2032
    Edge findEdge(Node s, Node t, Edge p = INVALID) const {
2033 2033
      if (s != t) {
2034 2034
        if (p == INVALID) {
2035 2035
          Edge arc = _digraph->findArc(s, t);
2036 2036
          if (arc != INVALID) return arc;
2037 2037
          arc = _digraph->findArc(t, s);
2038 2038
          if (arc != INVALID) return arc;
2039 2039
        } else if (_digraph->source(p) == s) {
2040 2040
          Edge arc = _digraph->findArc(s, t, p);
2041 2041
          if (arc != INVALID) return arc;
2042 2042
          arc = _digraph->findArc(t, s);
2043 2043
          if (arc != INVALID) return arc;
2044 2044
        } else {
2045 2045
          Edge arc = _digraph->findArc(t, s, p);
2046 2046
          if (arc != INVALID) return arc;
2047 2047
        }
2048 2048
      } else {
2049 2049
        return _digraph->findArc(s, t, p);
2050 2050
      }
2051 2051
      return INVALID;
2052 2052
    }
2053 2053

	
2054 2054
  private:
2055 2055

	
2056 2056
    template <typename V>
2057 2057
    class ArcMapBase {
2058 2058
    private:
2059 2059

	
2060 2060
      typedef typename DGR::template ArcMap<V> MapImpl;
2061 2061

	
2062 2062
    public:
2063 2063

	
2064 2064
      typedef typename MapTraits<MapImpl>::ReferenceMapTag ReferenceMapTag;
2065 2065

	
2066 2066
      typedef V Value;
2067 2067
      typedef Arc Key;
2068 2068
      typedef typename MapTraits<MapImpl>::ConstReturnValue ConstReturnValue;
2069 2069
      typedef typename MapTraits<MapImpl>::ReturnValue ReturnValue;
2070 2070
      typedef typename MapTraits<MapImpl>::ConstReturnValue ConstReference;
2071 2071
      typedef typename MapTraits<MapImpl>::ReturnValue Reference;
2072 2072

	
2073 2073
      ArcMapBase(const UndirectorBase<DGR>& adaptor) :
2074 2074
        _forward(*adaptor._digraph), _backward(*adaptor._digraph) {}
2075 2075

	
2076 2076
      ArcMapBase(const UndirectorBase<DGR>& adaptor, const V& value)
2077 2077
        : _forward(*adaptor._digraph, value), 
2078 2078
          _backward(*adaptor._digraph, value) {}
2079 2079

	
2080 2080
      void set(const Arc& a, const V& value) {
2081 2081
        if (direction(a)) {
2082 2082
          _forward.set(a, value);
2083 2083
        } else {
2084 2084
          _backward.set(a, value);
2085 2085
        }
2086 2086
      }
2087 2087

	
2088 2088
      ConstReturnValue operator[](const Arc& a) const {
2089 2089
        if (direction(a)) {
2090 2090
          return _forward[a];
2091 2091
        } else {
2092 2092
          return _backward[a];
2093 2093
        }
2094 2094
      }
2095 2095

	
2096 2096
      ReturnValue operator[](const Arc& a) {
2097 2097
        if (direction(a)) {
2098 2098
          return _forward[a];
2099 2099
        } else {
2100 2100
          return _backward[a];
2101 2101
        }
2102 2102
      }
2103 2103

	
2104 2104
    protected:
2105 2105

	
2106 2106
      MapImpl _forward, _backward;
2107 2107

	
2108 2108
    };
2109 2109

	
2110 2110
  public:
2111 2111

	
2112 2112
    template <typename V>
2113 2113
    class NodeMap : public DGR::template NodeMap<V> {
2114 2114
    public:
2115 2115

	
2116 2116
      typedef V Value;
2117 2117
      typedef typename DGR::template NodeMap<Value> Parent;
2118 2118

	
2119 2119
      explicit NodeMap(const UndirectorBase<DGR>& adaptor)
2120 2120
        : Parent(*adaptor._digraph) {}
2121 2121

	
2122 2122
      NodeMap(const UndirectorBase<DGR>& adaptor, const V& value)
2123 2123
        : Parent(*adaptor._digraph, value) { }
2124 2124

	
2125 2125
    private:
2126 2126
      NodeMap& operator=(const NodeMap& cmap) {
2127 2127
        return operator=<NodeMap>(cmap);
2128 2128
      }
2129 2129

	
2130 2130
      template <typename CMap>
2131 2131
      NodeMap& operator=(const CMap& cmap) {
2132 2132
        Parent::operator=(cmap);
2133 2133
        return *this;
2134 2134
      }
2135 2135

	
2136 2136
    };
2137 2137

	
2138 2138
    template <typename V>
2139 2139
    class ArcMap
2140 2140
      : public SubMapExtender<UndirectorBase<DGR>, ArcMapBase<V> >
2141 2141
    {
2142 2142
    public:
2143 2143
      typedef V Value;
2144 2144
      typedef SubMapExtender<Adaptor, ArcMapBase<V> > Parent;
2145 2145

	
2146 2146
      explicit ArcMap(const UndirectorBase<DGR>& adaptor)
2147 2147
        : Parent(adaptor) {}
2148 2148

	
2149 2149
      ArcMap(const UndirectorBase<DGR>& adaptor, const V& value)
2150 2150
        : Parent(adaptor, value) {}
2151 2151

	
2152 2152
    private:
2153 2153
      ArcMap& operator=(const ArcMap& cmap) {
2154 2154
        return operator=<ArcMap>(cmap);
2155 2155
      }
2156 2156

	
2157 2157
      template <typename CMap>
2158 2158
      ArcMap& operator=(const CMap& cmap) {
2159 2159
        Parent::operator=(cmap);
2160 2160
        return *this;
2161 2161
      }
2162 2162
    };
2163 2163

	
2164 2164
    template <typename V>
2165 2165
    class EdgeMap : public Digraph::template ArcMap<V> {
2166 2166
    public:
2167 2167

	
2168 2168
      typedef V Value;
2169 2169
      typedef typename Digraph::template ArcMap<V> Parent;
2170 2170

	
2171 2171
      explicit EdgeMap(const UndirectorBase<DGR>& adaptor)
2172 2172
        : Parent(*adaptor._digraph) {}
2173 2173

	
2174 2174
      EdgeMap(const UndirectorBase<DGR>& adaptor, const V& value)
2175 2175
        : Parent(*adaptor._digraph, value) {}
2176 2176

	
2177 2177
    private:
2178 2178
      EdgeMap& operator=(const EdgeMap& cmap) {
2179 2179
        return operator=<EdgeMap>(cmap);
2180 2180
      }
2181 2181

	
2182 2182
      template <typename CMap>
2183 2183
      EdgeMap& operator=(const CMap& cmap) {
2184 2184
        Parent::operator=(cmap);
2185 2185
        return *this;
2186 2186
      }
2187 2187

	
2188 2188
    };
2189 2189

	
2190 2190
    typedef typename ItemSetTraits<DGR, Node>::ItemNotifier NodeNotifier;
2191 2191
    NodeNotifier& notifier(Node) const { return _digraph->notifier(Node()); }
2192 2192

	
2193 2193
    typedef typename ItemSetTraits<DGR, Edge>::ItemNotifier EdgeNotifier;
2194 2194
    EdgeNotifier& notifier(Edge) const { return _digraph->notifier(Edge()); }
2195 2195

	
2196 2196
  protected:
2197 2197

	
2198 2198
    UndirectorBase() : _digraph(0) {}
2199 2199

	
2200 2200
    DGR* _digraph;
2201 2201

	
2202 2202
    void initialize(DGR& digraph) {
2203 2203
      _digraph = &digraph;
2204 2204
    }
2205 2205

	
2206 2206
  };
2207 2207

	
2208 2208
  /// \ingroup graph_adaptors
2209 2209
  ///
2210 2210
  /// \brief Adaptor class for viewing a digraph as an undirected graph.
2211 2211
  ///
2212 2212
  /// Undirector adaptor can be used for viewing a digraph as an undirected
2213 2213
  /// graph. All arcs of the underlying digraph are showed in the
2214 2214
  /// adaptor as an edge (and also as a pair of arcs, of course).
2215 2215
  /// This adaptor conforms to the \ref concepts::Graph "Graph" concept.
2216 2216
  ///
2217 2217
  /// The adapted digraph can also be modified through this adaptor
2218 2218
  /// by adding or removing nodes or edges, unless the \c GR template
2219 2219
  /// parameter is set to be \c const.
2220 2220
  ///
2221 2221
  /// \tparam DGR The type of the adapted digraph.
2222 2222
  /// It must conform to the \ref concepts::Digraph "Digraph" concept.
2223 2223
  /// It can also be specified to be \c const.
2224 2224
  ///
2225 2225
  /// \note The \c Node type of this adaptor and the adapted digraph are
2226 2226
  /// convertible to each other, moreover the \c Edge type of the adaptor
2227 2227
  /// and the \c Arc type of the adapted digraph are also convertible to
2228 2228
  /// each other.
2229 2229
  /// (Thus the \c Arc type of the adaptor is convertible to the \c Arc type
2230 2230
  /// of the adapted digraph.)
2231 2231
  template<typename DGR>
2232 2232
#ifdef DOXYGEN
2233 2233
  class Undirector {
2234 2234
#else
2235 2235
  class Undirector :
2236 2236
    public GraphAdaptorExtender<UndirectorBase<DGR> > {
2237 2237
#endif
2238 2238
  public:
2239 2239
    /// The type of the adapted digraph.
2240 2240
    typedef DGR Digraph;
2241 2241
    typedef GraphAdaptorExtender<UndirectorBase<DGR> > Parent;
2242 2242
  protected:
2243 2243
    Undirector() { }
2244 2244
  public:
2245 2245

	
2246 2246
    /// \brief Constructor
2247 2247
    ///
2248 2248
    /// Creates an undirected graph from the given digraph.
2249 2249
    Undirector(DGR& digraph) {
2250 2250
      initialize(digraph);
2251 2251
    }
2252 2252

	
2253 2253
    /// \brief Arc map combined from two original arc maps
2254 2254
    ///
2255 2255
    /// This map adaptor class adapts two arc maps of the underlying
2256 2256
    /// digraph to get an arc map of the undirected graph.
2257
    /// Its value type is inherited from the first arc map type
2258
    /// (\c %ForwardMap).
2259
    template <typename ForwardMap, typename BackwardMap>
2257
    /// Its value type is inherited from the first arc map type (\c FW).
2258
    /// \tparam FW The type of the "foward" arc map.
2259
    /// \tparam BK The type of the "backward" arc map.
2260
    template <typename FW, typename BK>
2260 2261
    class CombinedArcMap {
2261 2262
    public:
2262 2263

	
2263 2264
      /// The key type of the map
2264 2265
      typedef typename Parent::Arc Key;
2265 2266
      /// The value type of the map
2266
      typedef typename ForwardMap::Value Value;
2267

	
2268
      typedef typename MapTraits<ForwardMap>::ReferenceMapTag ReferenceMapTag;
2269

	
2270
      typedef typename MapTraits<ForwardMap>::ReturnValue ReturnValue;
2271
      typedef typename MapTraits<ForwardMap>::ConstReturnValue ConstReturnValue;
2272
      typedef typename MapTraits<ForwardMap>::ReturnValue Reference;
2273
      typedef typename MapTraits<ForwardMap>::ConstReturnValue ConstReference;
2267
      typedef typename FW::Value Value;
2268

	
2269
      typedef typename MapTraits<FW>::ReferenceMapTag ReferenceMapTag;
2270

	
2271
      typedef typename MapTraits<FW>::ReturnValue ReturnValue;
2272
      typedef typename MapTraits<FW>::ConstReturnValue ConstReturnValue;
2273
      typedef typename MapTraits<FW>::ReturnValue Reference;
2274
      typedef typename MapTraits<FW>::ConstReturnValue ConstReference;
2274 2275

	
2275 2276
      /// Constructor
2276
      CombinedArcMap(ForwardMap& forward, BackwardMap& backward)
2277
      CombinedArcMap(FW& forward, BK& backward)
2277 2278
        : _forward(&forward), _backward(&backward) {}
2278 2279

	
2279 2280
      /// Sets the value associated with the given key.
2280 2281
      void set(const Key& e, const Value& a) {
2281 2282
        if (Parent::direction(e)) {
2282 2283
          _forward->set(e, a);
2283 2284
        } else {
2284 2285
          _backward->set(e, a);
2285 2286
        }
2286 2287
      }
2287 2288

	
2288 2289
      /// Returns the value associated with the given key.
2289 2290
      ConstReturnValue operator[](const Key& e) const {
2290 2291
        if (Parent::direction(e)) {
2291 2292
          return (*_forward)[e];
2292 2293
        } else {
2293 2294
          return (*_backward)[e];
2294 2295
        }
2295 2296
      }
2296 2297

	
2297 2298
      /// Returns a reference to the value associated with the given key.
2298 2299
      ReturnValue operator[](const Key& e) {
2299 2300
        if (Parent::direction(e)) {
2300 2301
          return (*_forward)[e];
2301 2302
        } else {
2302 2303
          return (*_backward)[e];
2303 2304
        }
2304 2305
      }
2305 2306

	
2306 2307
    protected:
2307 2308

	
2308
      ForwardMap* _forward;
2309
      BackwardMap* _backward;
2309
      FW* _forward;
2310
      BK* _backward;
2310 2311

	
2311 2312
    };
2312 2313

	
2313 2314
    /// \brief Returns a combined arc map
2314 2315
    ///
2315 2316
    /// This function just returns a combined arc map.
2316
    template <typename ForwardMap, typename BackwardMap>
2317
    static CombinedArcMap<ForwardMap, BackwardMap>
2318
    combinedArcMap(ForwardMap& forward, BackwardMap& backward) {
2319
      return CombinedArcMap<ForwardMap, BackwardMap>(forward, backward);
2317
    template <typename FW, typename BK>
2318
    static CombinedArcMap<FW, BK>
2319
    combinedArcMap(FW& forward, BK& backward) {
2320
      return CombinedArcMap<FW, BK>(forward, backward);
2320 2321
    }
2321 2322

	
2322
    template <typename ForwardMap, typename BackwardMap>
2323
    static CombinedArcMap<const ForwardMap, BackwardMap>
2324
    combinedArcMap(const ForwardMap& forward, BackwardMap& backward) {
2325
      return CombinedArcMap<const ForwardMap,
2326
        BackwardMap>(forward, backward);
2323
    template <typename FW, typename BK>
2324
    static CombinedArcMap<const FW, BK>
2325
    combinedArcMap(const FW& forward, BK& backward) {
2326
      return CombinedArcMap<const FW, BK>(forward, backward);
2327 2327
    }
2328 2328

	
2329
    template <typename ForwardMap, typename BackwardMap>
2330
    static CombinedArcMap<ForwardMap, const BackwardMap>
2331
    combinedArcMap(ForwardMap& forward, const BackwardMap& backward) {
2332
      return CombinedArcMap<ForwardMap,
2333
        const BackwardMap>(forward, backward);
2329
    template <typename FW, typename BK>
2330
    static CombinedArcMap<FW, const BK>
2331
    combinedArcMap(FW& forward, const BK& backward) {
2332
      return CombinedArcMap<FW, const BK>(forward, backward);
2334 2333
    }
2335 2334

	
2336
    template <typename ForwardMap, typename BackwardMap>
2337
    static CombinedArcMap<const ForwardMap, const BackwardMap>
2338
    combinedArcMap(const ForwardMap& forward, const BackwardMap& backward) {
2339
      return CombinedArcMap<const ForwardMap,
2340
        const BackwardMap>(forward, backward);
2335
    template <typename FW, typename BK>
2336
    static CombinedArcMap<const FW, const BK>
2337
    combinedArcMap(const FW& forward, const BK& backward) {
2338
      return CombinedArcMap<const FW, const BK>(forward, backward);
2341 2339
    }
2342 2340

	
2343 2341
  };
2344 2342

	
2345 2343
  /// \brief Returns a read-only Undirector adaptor
2346 2344
  ///
2347 2345
  /// This function just returns a read-only \ref Undirector adaptor.
2348 2346
  /// \ingroup graph_adaptors
2349 2347
  /// \relates Undirector
2350 2348
  template<typename DGR>
2351 2349
  Undirector<const DGR> undirector(const DGR& digraph) {
2352 2350
    return Undirector<const DGR>(digraph);
2353 2351
  }
2354 2352

	
2355 2353

	
2356 2354
  template <typename GR, typename DM>
2357 2355
  class OrienterBase {
2358 2356
  public:
2359 2357

	
2360 2358
    typedef GR Graph;
2361 2359
    typedef DM DirectionMap;
2362 2360

	
2363 2361
    typedef typename GR::Node Node;
2364 2362
    typedef typename GR::Edge Arc;
2365 2363

	
2366 2364
    void reverseArc(const Arc& arc) {
2367 2365
      _direction->set(arc, !(*_direction)[arc]);
2368 2366
    }
2369 2367

	
2370 2368
    void first(Node& i) const { _graph->first(i); }
2371 2369
    void first(Arc& i) const { _graph->first(i); }
2372 2370
    void firstIn(Arc& i, const Node& n) const {
2373 2371
      bool d = true;
2374 2372
      _graph->firstInc(i, d, n);
2375 2373
      while (i != INVALID && d == (*_direction)[i]) _graph->nextInc(i, d);
2376 2374
    }
2377 2375
    void firstOut(Arc& i, const Node& n ) const {
2378 2376
      bool d = true;
2379 2377
      _graph->firstInc(i, d, n);
2380 2378
      while (i != INVALID && d != (*_direction)[i]) _graph->nextInc(i, d);
2381 2379
    }
2382 2380

	
2383 2381
    void next(Node& i) const { _graph->next(i); }
2384 2382
    void next(Arc& i) const { _graph->next(i); }
2385 2383
    void nextIn(Arc& i) const {
2386 2384
      bool d = !(*_direction)[i];
2387 2385
      _graph->nextInc(i, d);
2388 2386
      while (i != INVALID && d == (*_direction)[i]) _graph->nextInc(i, d);
2389 2387
    }
2390 2388
    void nextOut(Arc& i) const {
2391 2389
      bool d = (*_direction)[i];
2392 2390
      _graph->nextInc(i, d);
2393 2391
      while (i != INVALID && d != (*_direction)[i]) _graph->nextInc(i, d);
2394 2392
    }
2395 2393

	
2396 2394
    Node source(const Arc& e) const {
2397 2395
      return (*_direction)[e] ? _graph->u(e) : _graph->v(e);
2398 2396
    }
2399 2397
    Node target(const Arc& e) const {
2400 2398
      return (*_direction)[e] ? _graph->v(e) : _graph->u(e);
2401 2399
    }
2402 2400

	
2403 2401
    typedef NodeNumTagIndicator<Graph> NodeNumTag;
2404 2402
    int nodeNum() const { return _graph->nodeNum(); }
2405 2403

	
2406 2404
    typedef EdgeNumTagIndicator<Graph> ArcNumTag;
2407 2405
    int arcNum() const { return _graph->edgeNum(); }
2408 2406

	
2409 2407
    typedef FindEdgeTagIndicator<Graph> FindArcTag;
2410 2408
    Arc findArc(const Node& u, const Node& v,
2411 2409
                const Arc& prev = INVALID) const {
2412 2410
      Arc arc = _graph->findEdge(u, v, prev);
2413 2411
      while (arc != INVALID && source(arc) != u) {
2414 2412
        arc = _graph->findEdge(u, v, arc);
2415 2413
      }
2416 2414
      return arc;
2417 2415
    }
2418 2416

	
2419 2417
    Node addNode() {
2420 2418
      return Node(_graph->addNode());
2421 2419
    }
2422 2420

	
2423 2421
    Arc addArc(const Node& u, const Node& v) {
2424 2422
      Arc arc = _graph->addEdge(u, v);
2425 2423
      _direction->set(arc, _graph->u(arc) == u);
2426 2424
      return arc;
2427 2425
    }
2428 2426

	
2429 2427
    void erase(const Node& i) { _graph->erase(i); }
2430 2428
    void erase(const Arc& i) { _graph->erase(i); }
2431 2429

	
2432 2430
    void clear() { _graph->clear(); }
2433 2431

	
2434 2432
    int id(const Node& v) const { return _graph->id(v); }
2435 2433
    int id(const Arc& e) const { return _graph->id(e); }
2436 2434

	
2437 2435
    Node nodeFromId(int idx) const { return _graph->nodeFromId(idx); }
2438 2436
    Arc arcFromId(int idx) const { return _graph->edgeFromId(idx); }
2439 2437

	
2440 2438
    int maxNodeId() const { return _graph->maxNodeId(); }
2441 2439
    int maxArcId() const { return _graph->maxEdgeId(); }
2442 2440

	
2443 2441
    typedef typename ItemSetTraits<GR, Node>::ItemNotifier NodeNotifier;
2444 2442
    NodeNotifier& notifier(Node) const { return _graph->notifier(Node()); }
2445 2443

	
2446 2444
    typedef typename ItemSetTraits<GR, Arc>::ItemNotifier ArcNotifier;
2447 2445
    ArcNotifier& notifier(Arc) const { return _graph->notifier(Arc()); }
2448 2446

	
2449 2447
    template <typename V>
2450 2448
    class NodeMap : public GR::template NodeMap<V> {
2451 2449
    public:
2452 2450

	
2453 2451
      typedef typename GR::template NodeMap<V> Parent;
2454 2452

	
2455 2453
      explicit NodeMap(const OrienterBase<GR, DM>& adapter)
2456 2454
        : Parent(*adapter._graph) {}
2457 2455

	
2458 2456
      NodeMap(const OrienterBase<GR, DM>& adapter, const V& value)
2459 2457
        : Parent(*adapter._graph, value) {}
2460 2458

	
2461 2459
    private:
2462 2460
      NodeMap& operator=(const NodeMap& cmap) {
2463 2461
        return operator=<NodeMap>(cmap);
2464 2462
      }
2465 2463

	
2466 2464
      template <typename CMap>
2467 2465
      NodeMap& operator=(const CMap& cmap) {
2468 2466
        Parent::operator=(cmap);
2469 2467
        return *this;
2470 2468
      }
2471 2469

	
2472 2470
    };
2473 2471

	
2474 2472
    template <typename V>
2475 2473
    class ArcMap : public GR::template EdgeMap<V> {
2476 2474
    public:
2477 2475

	
2478 2476
      typedef typename Graph::template EdgeMap<V> Parent;
2479 2477

	
2480 2478
      explicit ArcMap(const OrienterBase<GR, DM>& adapter)
2481 2479
        : Parent(*adapter._graph) { }
2482 2480

	
2483 2481
      ArcMap(const OrienterBase<GR, DM>& adapter, const V& value)
2484 2482
        : Parent(*adapter._graph, value) { }
2485 2483

	
2486 2484
    private:
2487 2485
      ArcMap& operator=(const ArcMap& cmap) {
2488 2486
        return operator=<ArcMap>(cmap);
2489 2487
      }
2490 2488

	
2491 2489
      template <typename CMap>
2492 2490
      ArcMap& operator=(const CMap& cmap) {
2493 2491
        Parent::operator=(cmap);
2494 2492
        return *this;
2495 2493
      }
2496 2494
    };
2497 2495

	
2498 2496

	
2499 2497

	
2500 2498
  protected:
2501 2499
    Graph* _graph;
2502 2500
    DM* _direction;
2503 2501

	
2504 2502
    void initialize(GR& graph, DM& direction) {
2505 2503
      _graph = &graph;
2506 2504
      _direction = &direction;
2507 2505
    }
2508 2506

	
2509 2507
  };
2510 2508

	
2511 2509
  /// \ingroup graph_adaptors
2512 2510
  ///
2513 2511
  /// \brief Adaptor class for orienting the edges of a graph to get a digraph
2514 2512
  ///
2515 2513
  /// Orienter adaptor can be used for orienting the edges of a graph to
2516 2514
  /// get a digraph. A \c bool edge map of the underlying graph must be
2517 2515
  /// specified, which define the direction of the arcs in the adaptor.
2518 2516
  /// The arcs can be easily reversed by the \c reverseArc() member function
2519 2517
  /// of the adaptor.
2520 2518
  /// This class conforms to the \ref concepts::Digraph "Digraph" concept.
2521 2519
  ///
2522 2520
  /// The adapted graph can also be modified through this adaptor
2523 2521
  /// by adding or removing nodes or arcs, unless the \c GR template
2524 2522
  /// parameter is set to be \c const.
2525 2523
  ///
2526 2524
  /// \tparam GR The type of the adapted graph.
2527 2525
  /// It must conform to the \ref concepts::Graph "Graph" concept.
2528 2526
  /// It can also be specified to be \c const.
2529 2527
  /// \tparam DM The type of the direction map.
2530 2528
  /// It must be a \c bool (or convertible) edge map of the
2531 2529
  /// adapted graph. The default type is
2532 2530
  /// \ref concepts::Graph::EdgeMap "GR::EdgeMap<bool>".
2533 2531
  ///
2534 2532
  /// \note The \c Node type of this adaptor and the adapted graph are
2535 2533
  /// convertible to each other, moreover the \c Arc type of the adaptor
2536 2534
  /// and the \c Edge type of the adapted graph are also convertible to
2537 2535
  /// each other.
2538 2536
#ifdef DOXYGEN
2539 2537
  template<typename GR,
2540 2538
           typename DM>
2541 2539
  class Orienter {
2542 2540
#else
2543 2541
  template<typename GR,
2544 2542
           typename DM = typename GR::template EdgeMap<bool> >
2545 2543
  class Orienter :
2546 2544
    public DigraphAdaptorExtender<OrienterBase<GR, DM> > {
2547 2545
#endif
2548 2546
  public:
2549 2547

	
2550 2548
    /// The type of the adapted graph.
2551 2549
    typedef GR Graph;
2552 2550
    /// The type of the direction edge map.
2553 2551
    typedef DM DirectionMap;
2554 2552

	
2555 2553
    typedef DigraphAdaptorExtender<OrienterBase<GR, DM> > Parent;
2556 2554
    typedef typename Parent::Arc Arc;
2557 2555
  protected:
2558 2556
    Orienter() { }
2559 2557
  public:
2560 2558

	
2561 2559
    /// \brief Constructor
2562 2560
    ///
2563 2561
    /// Constructor of the adaptor.
2564 2562
    Orienter(GR& graph, DM& direction) {
2565 2563
      Parent::initialize(graph, direction);
2566 2564
    }
2567 2565

	
2568 2566
    /// \brief Reverses the given arc
2569 2567
    ///
2570 2568
    /// This function reverses the given arc.
2571 2569
    /// It is done by simply negate the assigned value of \c a
2572 2570
    /// in the direction map.
2573 2571
    void reverseArc(const Arc& a) {
2574 2572
      Parent::reverseArc(a);
2575 2573
    }
2576 2574
  };
2577 2575

	
2578 2576
  /// \brief Returns a read-only Orienter adaptor
2579 2577
  ///
2580 2578
  /// This function just returns a read-only \ref Orienter adaptor.
2581 2579
  /// \ingroup graph_adaptors
2582 2580
  /// \relates Orienter
2583 2581
  template<typename GR, typename DM>
2584 2582
  Orienter<const GR, DM>
2585 2583
  orienter(const GR& graph, DM& direction) {
2586 2584
    return Orienter<const GR, DM>(graph, direction);
2587 2585
  }
2588 2586

	
2589 2587
  template<typename GR, typename DM>
2590 2588
  Orienter<const GR, const DM>
2591 2589
  orienter(const GR& graph, const DM& direction) {
2592 2590
    return Orienter<const GR, const DM>(graph, direction);
2593 2591
  }
2594 2592

	
2595 2593
  namespace _adaptor_bits {
2596 2594

	
2597 2595
    template <typename DGR, typename CM, typename FM, typename TL>
2598 2596
    class ResForwardFilter {
2599 2597
    public:
2600 2598

	
2601 2599
      typedef typename DGR::Arc Key;
2602 2600
      typedef bool Value;
2603 2601

	
2604 2602
    private:
2605 2603

	
2606 2604
      const CM* _capacity;
2607 2605
      const FM* _flow;
2608 2606
      TL _tolerance;
2609 2607

	
2610 2608
    public:
2611 2609

	
2612 2610
      ResForwardFilter(const CM& capacity, const FM& flow,
2613 2611
                       const TL& tolerance = TL())
2614 2612
        : _capacity(&capacity), _flow(&flow), _tolerance(tolerance) { }
2615 2613

	
2616 2614
      bool operator[](const typename DGR::Arc& a) const {
2617 2615
        return _tolerance.positive((*_capacity)[a] - (*_flow)[a]);
2618 2616
      }
2619 2617
    };
2620 2618

	
2621 2619
    template<typename DGR,typename CM, typename FM, typename TL>
2622 2620
    class ResBackwardFilter {
2623 2621
    public:
2624 2622

	
2625 2623
      typedef typename DGR::Arc Key;
2626 2624
      typedef bool Value;
2627 2625

	
2628 2626
    private:
2629 2627

	
2630 2628
      const CM* _capacity;
2631 2629
      const FM* _flow;
2632 2630
      TL _tolerance;
2633 2631

	
2634 2632
    public:
2635 2633

	
2636 2634
      ResBackwardFilter(const CM& capacity, const FM& flow,
2637 2635
                        const TL& tolerance = TL())
2638 2636
        : _capacity(&capacity), _flow(&flow), _tolerance(tolerance) { }
2639 2637

	
2640 2638
      bool operator[](const typename DGR::Arc& a) const {
2641 2639
        return _tolerance.positive((*_flow)[a]);
2642 2640
      }
2643 2641
    };
2644 2642

	
2645 2643
  }
2646 2644

	
2647 2645
  /// \ingroup graph_adaptors
2648 2646
  ///
2649 2647
  /// \brief Adaptor class for composing the residual digraph for directed
2650 2648
  /// flow and circulation problems.
2651 2649
  ///
2652 2650
  /// ResidualDigraph can be used for composing the \e residual digraph
2653 2651
  /// for directed flow and circulation problems. Let \f$ G=(V, A) \f$
2654 2652
  /// be a directed graph and let \f$ F \f$ be a number type.
2655 2653
  /// Let \f$ flow, cap: A\to F \f$ be functions on the arcs.
2656 2654
  /// This adaptor implements a digraph structure with node set \f$ V \f$
2657 2655
  /// and arc set \f$ A_{forward}\cup A_{backward} \f$,
2658 2656
  /// where \f$ A_{forward}=\{uv : uv\in A, flow(uv)<cap(uv)\} \f$ and
2659 2657
  /// \f$ A_{backward}=\{vu : uv\in A, flow(uv)>0\} \f$, i.e. the so
2660 2658
  /// called residual digraph.
2661 2659
  /// When the union \f$ A_{forward}\cup A_{backward} \f$ is taken,
2662 2660
  /// multiplicities are counted, i.e. the adaptor has exactly
2663 2661
  /// \f$ |A_{forward}| + |A_{backward}|\f$ arcs (it may have parallel
2664 2662
  /// arcs).
2665 2663
  /// This class conforms to the \ref concepts::Digraph "Digraph" concept.
2666 2664
  ///
2667 2665
  /// \tparam DGR The type of the adapted digraph.
2668 2666
  /// It must conform to the \ref concepts::Digraph "Digraph" concept.
2669 2667
  /// It is implicitly \c const.
2670 2668
  /// \tparam CM The type of the capacity map.
2671 2669
  /// It must be an arc map of some numerical type, which defines
2672 2670
  /// the capacities in the flow problem. It is implicitly \c const.
2673 2671
  /// The default type is
2674 2672
  /// \ref concepts::Digraph::ArcMap "GR::ArcMap<int>".
2675 2673
  /// \tparam FM The type of the flow map.
2676 2674
  /// It must be an arc map of some numerical type, which defines
2677 2675
  /// the flow values in the flow problem. The default type is \c CM.
2678 2676
  /// \tparam TL The tolerance type for handling inexact computation.
2679 2677
  /// The default tolerance type depends on the value type of the
2680 2678
  /// capacity map.
2681 2679
  ///
2682 2680
  /// \note This adaptor is implemented using Undirector and FilterArcs
2683 2681
  /// adaptors.
2684 2682
  ///
2685 2683
  /// \note The \c Node type of this adaptor and the adapted digraph are
2686 2684
  /// convertible to each other, moreover the \c Arc type of the adaptor
2687 2685
  /// is convertible to the \c Arc type of the adapted digraph.
2688 2686
#ifdef DOXYGEN
2689 2687
  template<typename DGR, typename CM, typename FM, typename TL>
2690 2688
  class ResidualDigraph
2691 2689
#else
2692 2690
  template<typename DGR,
2693 2691
           typename CM = typename DGR::template ArcMap<int>,
2694 2692
           typename FM = CM,
2695 2693
           typename TL = Tolerance<typename CM::Value> >
2696 2694
  class ResidualDigraph 
2697 2695
    : public SubDigraph<
2698 2696
        Undirector<const DGR>,
2699 2697
        ConstMap<typename DGR::Node, Const<bool, true> >,
2700 2698
        typename Undirector<const DGR>::template CombinedArcMap<
2701 2699
          _adaptor_bits::ResForwardFilter<const DGR, CM, FM, TL>,
2702 2700
          _adaptor_bits::ResBackwardFilter<const DGR, CM, FM, TL> > >
2703 2701
#endif
2704 2702
  {
2705 2703
  public:
2706 2704

	
2707 2705
    /// The type of the underlying digraph.
2708 2706
    typedef DGR Digraph;
2709 2707
    /// The type of the capacity map.
2710 2708
    typedef CM CapacityMap;
2711 2709
    /// The type of the flow map.
2712 2710
    typedef FM FlowMap;
2713 2711
    /// The tolerance type.
2714 2712
    typedef TL Tolerance;
2715 2713

	
2716 2714
    typedef typename CapacityMap::Value Value;
2717 2715
    typedef ResidualDigraph Adaptor;
2718 2716

	
2719 2717
  protected:
2720 2718

	
2721 2719
    typedef Undirector<const Digraph> Undirected;
2722 2720

	
2723 2721
    typedef ConstMap<typename DGR::Node, Const<bool, true> > NodeFilter;
2724 2722

	
2725 2723
    typedef _adaptor_bits::ResForwardFilter<const DGR, CM,
2726 2724
                                            FM, TL> ForwardFilter;
2727 2725

	
2728 2726
    typedef _adaptor_bits::ResBackwardFilter<const DGR, CM,
2729 2727
                                             FM, TL> BackwardFilter;
2730 2728

	
2731 2729
    typedef typename Undirected::
2732 2730
      template CombinedArcMap<ForwardFilter, BackwardFilter> ArcFilter;
2733 2731

	
2734 2732
    typedef SubDigraph<Undirected, NodeFilter, ArcFilter> Parent;
2735 2733

	
2736 2734
    const CapacityMap* _capacity;
2737 2735
    FlowMap* _flow;
2738 2736

	
2739 2737
    Undirected _graph;
2740 2738
    NodeFilter _node_filter;
2741 2739
    ForwardFilter _forward_filter;
2742 2740
    BackwardFilter _backward_filter;
2743 2741
    ArcFilter _arc_filter;
2744 2742

	
2745 2743
  public:
2746 2744

	
2747 2745
    /// \brief Constructor
2748 2746
    ///
2749 2747
    /// Constructor of the residual digraph adaptor. The parameters are the
2750 2748
    /// digraph, the capacity map, the flow map, and a tolerance object.
2751 2749
    ResidualDigraph(const DGR& digraph, const CM& capacity,
2752 2750
                    FM& flow, const TL& tolerance = Tolerance())
2753 2751
      : Parent(), _capacity(&capacity), _flow(&flow), 
2754 2752
        _graph(digraph), _node_filter(),
2755 2753
        _forward_filter(capacity, flow, tolerance),
2756 2754
        _backward_filter(capacity, flow, tolerance),
2757 2755
        _arc_filter(_forward_filter, _backward_filter)
2758 2756
    {
2759 2757
      Parent::initialize(_graph, _node_filter, _arc_filter);
2760 2758
    }
2761 2759

	
2762 2760
    typedef typename Parent::Arc Arc;
2763 2761

	
2764 2762
    /// \brief Returns the residual capacity of the given arc.
2765 2763
    ///
2766 2764
    /// Returns the residual capacity of the given arc.
2767 2765
    Value residualCapacity(const Arc& a) const {
2768 2766
      if (Undirected::direction(a)) {
2769 2767
        return (*_capacity)[a] - (*_flow)[a];
2770 2768
      } else {
2771 2769
        return (*_flow)[a];
2772 2770
      }
2773 2771
    }
2774 2772

	
2775 2773
    /// \brief Augments on the given arc in the residual digraph.
2776 2774
    ///
2777 2775
    /// Augments on the given arc in the residual digraph. It increases
2778 2776
    /// or decreases the flow value on the original arc according to the
2779 2777
    /// direction of the residual arc.
2780 2778
    void augment(const Arc& a, const Value& v) const {
2781 2779
      if (Undirected::direction(a)) {
2782 2780
        _flow->set(a, (*_flow)[a] + v);
2783 2781
      } else {
2784 2782
        _flow->set(a, (*_flow)[a] - v);
2785 2783
      }
2786 2784
    }
2787 2785

	
2788 2786
    /// \brief Returns \c true if the given residual arc is a forward arc.
2789 2787
    ///
2790 2788
    /// Returns \c true if the given residual arc has the same orientation
2791 2789
    /// as the original arc, i.e. it is a so called forward arc.
2792 2790
    static bool forward(const Arc& a) {
2793 2791
      return Undirected::direction(a);
2794 2792
    }
2795 2793

	
2796 2794
    /// \brief Returns \c true if the given residual arc is a backward arc.
2797 2795
    ///
2798 2796
    /// Returns \c true if the given residual arc has the opposite orientation
2799 2797
    /// than the original arc, i.e. it is a so called backward arc.
2800 2798
    static bool backward(const Arc& a) {
2801 2799
      return !Undirected::direction(a);
2802 2800
    }
2803 2801

	
2804 2802
    /// \brief Returns the forward oriented residual arc.
2805 2803
    ///
2806 2804
    /// Returns the forward oriented residual arc related to the given
2807 2805
    /// arc of the underlying digraph.
2808 2806
    static Arc forward(const typename Digraph::Arc& a) {
2809 2807
      return Undirected::direct(a, true);
2810 2808
    }
2811 2809

	
2812 2810
    /// \brief Returns the backward oriented residual arc.
2813 2811
    ///
2814 2812
    /// Returns the backward oriented residual arc related to the given
2815 2813
    /// arc of the underlying digraph.
2816 2814
    static Arc backward(const typename Digraph::Arc& a) {
2817 2815
      return Undirected::direct(a, false);
2818 2816
    }
2819 2817

	
2820 2818
    /// \brief Residual capacity map.
2821 2819
    ///
2822 2820
    /// This map adaptor class can be used for obtaining the residual
2823 2821
    /// capacities as an arc map of the residual digraph.
2824 2822
    /// Its value type is inherited from the capacity map.
2825 2823
    class ResidualCapacity {
2826 2824
    protected:
2827 2825
      const Adaptor* _adaptor;
2828 2826
    public:
2829 2827
      /// The key type of the map
2830 2828
      typedef Arc Key;
2831 2829
      /// The value type of the map
2832 2830
      typedef typename CapacityMap::Value Value;
2833 2831

	
2834 2832
      /// Constructor
2835 2833
      ResidualCapacity(const ResidualDigraph<DGR, CM, FM, TL>& adaptor) 
2836 2834
        : _adaptor(&adaptor) {}
2837 2835

	
2838 2836
      /// Returns the value associated with the given residual arc
2839 2837
      Value operator[](const Arc& a) const {
2840 2838
        return _adaptor->residualCapacity(a);
2841 2839
      }
2842 2840

	
2843 2841
    };
2844 2842

	
2845 2843
    /// \brief Returns a residual capacity map
2846 2844
    ///
2847 2845
    /// This function just returns a residual capacity map.
2848 2846
    ResidualCapacity residualCapacity() const {
2849 2847
      return ResidualCapacity(*this);
2850 2848
    }
2851 2849

	
2852 2850
  };
2853 2851

	
2854 2852
  /// \brief Returns a (read-only) Residual adaptor
2855 2853
  ///
2856 2854
  /// This function just returns a (read-only) \ref ResidualDigraph adaptor.
2857 2855
  /// \ingroup graph_adaptors
2858 2856
  /// \relates ResidualDigraph
2859 2857
    template<typename DGR, typename CM, typename FM>
2860 2858
  ResidualDigraph<DGR, CM, FM>
2861 2859
  residualDigraph(const DGR& digraph, const CM& capacity_map, FM& flow_map) {
2862 2860
    return ResidualDigraph<DGR, CM, FM> (digraph, capacity_map, flow_map);
2863 2861
  }
2864 2862

	
2865 2863

	
2866 2864
  template <typename DGR>
2867 2865
  class SplitNodesBase {
2868 2866
  public:
2869 2867

	
2870 2868
    typedef DGR Digraph;
2871 2869
    typedef DigraphAdaptorBase<const DGR> Parent;
2872 2870
    typedef SplitNodesBase Adaptor;
2873 2871

	
2874 2872
    typedef typename DGR::Node DigraphNode;
2875 2873
    typedef typename DGR::Arc DigraphArc;
2876 2874

	
2877 2875
    class Node;
2878 2876
    class Arc;
2879 2877

	
2880 2878
  private:
2881 2879

	
2882 2880
    template <typename T> class NodeMapBase;
2883 2881
    template <typename T> class ArcMapBase;
2884 2882

	
2885 2883
  public:
2886 2884

	
2887 2885
    class Node : public DigraphNode {
2888 2886
      friend class SplitNodesBase;
2889 2887
      template <typename T> friend class NodeMapBase;
2890 2888
    private:
2891 2889

	
2892 2890
      bool _in;
2893 2891
      Node(DigraphNode node, bool in)
2894 2892
        : DigraphNode(node), _in(in) {}
2895 2893

	
2896 2894
    public:
2897 2895

	
2898 2896
      Node() {}
2899 2897
      Node(Invalid) : DigraphNode(INVALID), _in(true) {}
2900 2898

	
2901 2899
      bool operator==(const Node& node) const {
2902 2900
        return DigraphNode::operator==(node) && _in == node._in;
2903 2901
      }
2904 2902

	
2905 2903
      bool operator!=(const Node& node) const {
2906 2904
        return !(*this == node);
2907 2905
      }
2908 2906

	
2909 2907
      bool operator<(const Node& node) const {
2910 2908
        return DigraphNode::operator<(node) ||
2911 2909
          (DigraphNode::operator==(node) && _in < node._in);
2912 2910
      }
2913 2911
    };
2914 2912

	
2915 2913
    class Arc {
2916 2914
      friend class SplitNodesBase;
2917 2915
      template <typename T> friend class ArcMapBase;
2918 2916
    private:
2919 2917
      typedef BiVariant<DigraphArc, DigraphNode> ArcImpl;
2920 2918

	
2921 2919
      explicit Arc(const DigraphArc& arc) : _item(arc) {}
2922 2920
      explicit Arc(const DigraphNode& node) : _item(node) {}
2923 2921

	
2924 2922
      ArcImpl _item;
2925 2923

	
2926 2924
    public:
2927 2925
      Arc() {}
2928 2926
      Arc(Invalid) : _item(DigraphArc(INVALID)) {}
2929 2927

	
2930 2928
      bool operator==(const Arc& arc) const {
2931 2929
        if (_item.firstState()) {
2932 2930
          if (arc._item.firstState()) {
2933 2931
            return _item.first() == arc._item.first();
2934 2932
          }
2935 2933
        } else {
2936 2934
          if (arc._item.secondState()) {
2937 2935
            return _item.second() == arc._item.second();
2938 2936
          }
2939 2937
        }
2940 2938
        return false;
2941 2939
      }
2942 2940

	
2943 2941
      bool operator!=(const Arc& arc) const {
2944 2942
        return !(*this == arc);
2945 2943
      }
2946 2944

	
2947 2945
      bool operator<(const Arc& arc) const {
2948 2946
        if (_item.firstState()) {
2949 2947
          if (arc._item.firstState()) {
2950 2948
            return _item.first() < arc._item.first();
2951 2949
          }
2952 2950
          return false;
2953 2951
        } else {
2954 2952
          if (arc._item.secondState()) {
2955 2953
            return _item.second() < arc._item.second();
2956 2954
          }
2957 2955
          return true;
2958 2956
        }
2959 2957
      }
2960 2958

	
2961 2959
      operator DigraphArc() const { return _item.first(); }
2962 2960
      operator DigraphNode() const { return _item.second(); }
2963 2961

	
2964 2962
    };
2965 2963

	
2966 2964
    void first(Node& n) const {
2967 2965
      _digraph->first(n);
2968 2966
      n._in = true;
2969 2967
    }
2970 2968

	
2971 2969
    void next(Node& n) const {
2972 2970
      if (n._in) {
2973 2971
        n._in = false;
2974 2972
      } else {
2975 2973
        n._in = true;
2976 2974
        _digraph->next(n);
2977 2975
      }
2978 2976
    }
2979 2977

	
2980 2978
    void first(Arc& e) const {
2981 2979
      e._item.setSecond();
2982 2980
      _digraph->first(e._item.second());
2983 2981
      if (e._item.second() == INVALID) {
2984 2982
        e._item.setFirst();
2985 2983
        _digraph->first(e._item.first());
2986 2984
      }
2987 2985
    }
2988 2986

	
2989 2987
    void next(Arc& e) const {
2990 2988
      if (e._item.secondState()) {
2991 2989
        _digraph->next(e._item.second());
2992 2990
        if (e._item.second() == INVALID) {
2993 2991
          e._item.setFirst();
2994 2992
          _digraph->first(e._item.first());
2995 2993
        }
2996 2994
      } else {
2997 2995
        _digraph->next(e._item.first());
2998 2996
      }
2999 2997
    }
3000 2998

	
3001 2999
    void firstOut(Arc& e, const Node& n) const {
3002 3000
      if (n._in) {
3003 3001
        e._item.setSecond(n);
3004 3002
      } else {
3005 3003
        e._item.setFirst();
3006 3004
        _digraph->firstOut(e._item.first(), n);
3007 3005
      }
3008 3006
    }
3009 3007

	
3010 3008
    void nextOut(Arc& e) const {
3011 3009
      if (!e._item.firstState()) {
3012 3010
        e._item.setFirst(INVALID);
3013 3011
      } else {
3014 3012
        _digraph->nextOut(e._item.first());
3015 3013
      }
3016 3014
    }
3017 3015

	
3018 3016
    void firstIn(Arc& e, const Node& n) const {
3019 3017
      if (!n._in) {
3020 3018
        e._item.setSecond(n);
3021 3019
      } else {
3022 3020
        e._item.setFirst();
3023 3021
        _digraph->firstIn(e._item.first(), n);
3024 3022
      }
3025 3023
    }
3026 3024

	
3027 3025
    void nextIn(Arc& e) const {
3028 3026
      if (!e._item.firstState()) {
3029 3027
        e._item.setFirst(INVALID);
3030 3028
      } else {
3031 3029
        _digraph->nextIn(e._item.first());
3032 3030
      }
3033 3031
    }
3034 3032

	
3035 3033
    Node source(const Arc& e) const {
3036 3034
      if (e._item.firstState()) {
3037 3035
        return Node(_digraph->source(e._item.first()), false);
3038 3036
      } else {
3039 3037
        return Node(e._item.second(), true);
3040 3038
      }
3041 3039
    }
3042 3040

	
3043 3041
    Node target(const Arc& e) const {
3044 3042
      if (e._item.firstState()) {
3045 3043
        return Node(_digraph->target(e._item.first()), true);
3046 3044
      } else {
3047 3045
        return Node(e._item.second(), false);
3048 3046
      }
3049 3047
    }
3050 3048

	
3051 3049
    int id(const Node& n) const {
3052 3050
      return (_digraph->id(n) << 1) | (n._in ? 0 : 1);
3053 3051
    }
3054 3052
    Node nodeFromId(int ix) const {
3055 3053
      return Node(_digraph->nodeFromId(ix >> 1), (ix & 1) == 0);
3056 3054
    }
3057 3055
    int maxNodeId() const {
3058 3056
      return 2 * _digraph->maxNodeId() + 1;
3059 3057
    }
3060 3058

	
3061 3059
    int id(const Arc& e) const {
3062 3060
      if (e._item.firstState()) {
3063 3061
        return _digraph->id(e._item.first()) << 1;
3064 3062
      } else {
3065 3063
        return (_digraph->id(e._item.second()) << 1) | 1;
3066 3064
      }
3067 3065
    }
3068 3066
    Arc arcFromId(int ix) const {
3069 3067
      if ((ix & 1) == 0) {
3070 3068
        return Arc(_digraph->arcFromId(ix >> 1));
3071 3069
      } else {
3072 3070
        return Arc(_digraph->nodeFromId(ix >> 1));
3073 3071
      }
3074 3072
    }
3075 3073
    int maxArcId() const {
3076 3074
      return std::max(_digraph->maxNodeId() << 1,
3077 3075
                      (_digraph->maxArcId() << 1) | 1);
3078 3076
    }
3079 3077

	
3080 3078
    static bool inNode(const Node& n) {
3081 3079
      return n._in;
3082 3080
    }
3083 3081

	
3084 3082
    static bool outNode(const Node& n) {
3085 3083
      return !n._in;
3086 3084
    }
3087 3085

	
3088 3086
    static bool origArc(const Arc& e) {
3089 3087
      return e._item.firstState();
3090 3088
    }
3091 3089

	
3092 3090
    static bool bindArc(const Arc& e) {
3093 3091
      return e._item.secondState();
3094 3092
    }
3095 3093

	
3096 3094
    static Node inNode(const DigraphNode& n) {
3097 3095
      return Node(n, true);
3098 3096
    }
3099 3097

	
3100 3098
    static Node outNode(const DigraphNode& n) {
3101 3099
      return Node(n, false);
3102 3100
    }
3103 3101

	
3104 3102
    static Arc arc(const DigraphNode& n) {
3105 3103
      return Arc(n);
3106 3104
    }
3107 3105

	
3108 3106
    static Arc arc(const DigraphArc& e) {
3109 3107
      return Arc(e);
3110 3108
    }
3111 3109

	
3112 3110
    typedef True NodeNumTag;
3113 3111
    int nodeNum() const {
3114 3112
      return  2 * countNodes(*_digraph);
3115 3113
    }
3116 3114

	
3117 3115
    typedef True ArcNumTag;
3118 3116
    int arcNum() const {
3119 3117
      return countArcs(*_digraph) + countNodes(*_digraph);
3120 3118
    }
3121 3119

	
3122 3120
    typedef True FindArcTag;
3123 3121
    Arc findArc(const Node& u, const Node& v,
3124 3122
                const Arc& prev = INVALID) const {
3125 3123
      if (inNode(u) && outNode(v)) {
3126 3124
        if (static_cast<const DigraphNode&>(u) ==
3127 3125
            static_cast<const DigraphNode&>(v) && prev == INVALID) {
3128 3126
          return Arc(u);
3129 3127
        }
3130 3128
      }
3131 3129
      else if (outNode(u) && inNode(v)) {
3132 3130
        return Arc(::lemon::findArc(*_digraph, u, v, prev));
3133 3131
      }
3134 3132
      return INVALID;
3135 3133
    }
3136 3134

	
3137 3135
  private:
3138 3136

	
3139 3137
    template <typename V>
3140 3138
    class NodeMapBase
3141 3139
      : public MapTraits<typename Parent::template NodeMap<V> > {
3142 3140
      typedef typename Parent::template NodeMap<V> NodeImpl;
3143 3141
    public:
3144 3142
      typedef Node Key;
3145 3143
      typedef V Value;
3146 3144
      typedef typename MapTraits<NodeImpl>::ReferenceMapTag ReferenceMapTag;
3147 3145
      typedef typename MapTraits<NodeImpl>::ReturnValue ReturnValue;
3148 3146
      typedef typename MapTraits<NodeImpl>::ConstReturnValue ConstReturnValue;
3149 3147
      typedef typename MapTraits<NodeImpl>::ReturnValue Reference;
3150 3148
      typedef typename MapTraits<NodeImpl>::ConstReturnValue ConstReference;
3151 3149

	
3152 3150
      NodeMapBase(const SplitNodesBase<DGR>& adaptor)
3153 3151
        : _in_map(*adaptor._digraph), _out_map(*adaptor._digraph) {}
3154 3152
      NodeMapBase(const SplitNodesBase<DGR>& adaptor, const V& value)
3155 3153
        : _in_map(*adaptor._digraph, value),
3156 3154
          _out_map(*adaptor._digraph, value) {}
3157 3155

	
3158 3156
      void set(const Node& key, const V& val) {
3159 3157
        if (SplitNodesBase<DGR>::inNode(key)) { _in_map.set(key, val); }
3160 3158
        else {_out_map.set(key, val); }
3161 3159
      }
3162 3160

	
3163 3161
      ReturnValue operator[](const Node& key) {
3164 3162
        if (SplitNodesBase<DGR>::inNode(key)) { return _in_map[key]; }
3165 3163
        else { return _out_map[key]; }
3166 3164
      }
3167 3165

	
3168 3166
      ConstReturnValue operator[](const Node& key) const {
3169 3167
        if (Adaptor::inNode(key)) { return _in_map[key]; }
3170 3168
        else { return _out_map[key]; }
3171 3169
      }
3172 3170

	
3173 3171
    private:
3174 3172
      NodeImpl _in_map, _out_map;
3175 3173
    };
3176 3174

	
3177 3175
    template <typename V>
3178 3176
    class ArcMapBase
3179 3177
      : public MapTraits<typename Parent::template ArcMap<V> > {
3180 3178
      typedef typename Parent::template ArcMap<V> ArcImpl;
3181 3179
      typedef typename Parent::template NodeMap<V> NodeImpl;
3182 3180
    public:
3183 3181
      typedef Arc Key;
3184 3182
      typedef V Value;
3185 3183
      typedef typename MapTraits<ArcImpl>::ReferenceMapTag ReferenceMapTag;
3186 3184
      typedef typename MapTraits<ArcImpl>::ReturnValue ReturnValue;
3187 3185
      typedef typename MapTraits<ArcImpl>::ConstReturnValue ConstReturnValue;
3188 3186
      typedef typename MapTraits<ArcImpl>::ReturnValue Reference;
3189 3187
      typedef typename MapTraits<ArcImpl>::ConstReturnValue ConstReference;
3190 3188

	
3191 3189
      ArcMapBase(const SplitNodesBase<DGR>& adaptor)
3192 3190
        : _arc_map(*adaptor._digraph), _node_map(*adaptor._digraph) {}
3193 3191
      ArcMapBase(const SplitNodesBase<DGR>& adaptor, const V& value)
3194 3192
        : _arc_map(*adaptor._digraph, value),
3195 3193
          _node_map(*adaptor._digraph, value) {}
3196 3194

	
3197 3195
      void set(const Arc& key, const V& val) {
3198 3196
        if (SplitNodesBase<DGR>::origArc(key)) {
3199 3197
          _arc_map.set(static_cast<const DigraphArc&>(key), val);
3200 3198
        } else {
3201 3199
          _node_map.set(static_cast<const DigraphNode&>(key), val);
3202 3200
        }
3203 3201
      }
3204 3202

	
3205 3203
      ReturnValue operator[](const Arc& key) {
3206 3204
        if (SplitNodesBase<DGR>::origArc(key)) {
3207 3205
          return _arc_map[static_cast<const DigraphArc&>(key)];
3208 3206
        } else {
3209 3207
          return _node_map[static_cast<const DigraphNode&>(key)];
3210 3208
        }
3211 3209
      }
3212 3210

	
3213 3211
      ConstReturnValue operator[](const Arc& key) const {
3214 3212
        if (SplitNodesBase<DGR>::origArc(key)) {
3215 3213
          return _arc_map[static_cast<const DigraphArc&>(key)];
3216 3214
        } else {
3217 3215
          return _node_map[static_cast<const DigraphNode&>(key)];
3218 3216
        }
3219 3217
      }
3220 3218

	
3221 3219
    private:
3222 3220
      ArcImpl _arc_map;
3223 3221
      NodeImpl _node_map;
3224 3222
    };
3225 3223

	
3226 3224
  public:
3227 3225

	
3228 3226
    template <typename V>
3229 3227
    class NodeMap
3230 3228
      : public SubMapExtender<SplitNodesBase<DGR>, NodeMapBase<V> >
3231 3229
    {
3232 3230
    public:
3233 3231
      typedef V Value;
3234 3232
      typedef SubMapExtender<SplitNodesBase<DGR>, NodeMapBase<Value> > Parent;
3235 3233

	
3236 3234
      NodeMap(const SplitNodesBase<DGR>& adaptor)
3237 3235
        : Parent(adaptor) {}
3238 3236

	
3239 3237
      NodeMap(const SplitNodesBase<DGR>& adaptor, const V& value)
3240 3238
        : Parent(adaptor, value) {}
3241 3239

	
3242 3240
    private:
3243 3241
      NodeMap& operator=(const NodeMap& cmap) {
3244 3242
        return operator=<NodeMap>(cmap);
3245 3243
      }
3246 3244

	
3247 3245
      template <typename CMap>
3248 3246
      NodeMap& operator=(const CMap& cmap) {
3249 3247
        Parent::operator=(cmap);
3250 3248
        return *this;
3251 3249
      }
3252 3250
    };
3253 3251

	
3254 3252
    template <typename V>
3255 3253
    class ArcMap
3256 3254
      : public SubMapExtender<SplitNodesBase<DGR>, ArcMapBase<V> >
3257 3255
    {
3258 3256
    public:
3259 3257
      typedef V Value;
3260 3258
      typedef SubMapExtender<SplitNodesBase<DGR>, ArcMapBase<Value> > Parent;
3261 3259

	
3262 3260
      ArcMap(const SplitNodesBase<DGR>& adaptor)
3263 3261
        : Parent(adaptor) {}
3264 3262

	
3265 3263
      ArcMap(const SplitNodesBase<DGR>& adaptor, const V& value)
3266 3264
        : Parent(adaptor, value) {}
3267 3265

	
3268 3266
    private:
3269 3267
      ArcMap& operator=(const ArcMap& cmap) {
3270 3268
        return operator=<ArcMap>(cmap);
3271 3269
      }
3272 3270

	
3273 3271
      template <typename CMap>
3274 3272
      ArcMap& operator=(const CMap& cmap) {
3275 3273
        Parent::operator=(cmap);
3276 3274
        return *this;
3277 3275
      }
3278 3276
    };
3279 3277

	
3280 3278
  protected:
3281 3279

	
3282 3280
    SplitNodesBase() : _digraph(0) {}
3283 3281

	
3284 3282
    DGR* _digraph;
3285 3283

	
3286 3284
    void initialize(Digraph& digraph) {
3287 3285
      _digraph = &digraph;
3288 3286
    }
3289 3287

	
3290 3288
  };
3291 3289

	
3292 3290
  /// \ingroup graph_adaptors
3293 3291
  ///
3294 3292
  /// \brief Adaptor class for splitting the nodes of a digraph.
3295 3293
  ///
3296 3294
  /// SplitNodes adaptor can be used for splitting each node into an
3297 3295
  /// \e in-node and an \e out-node in a digraph. Formaly, the adaptor
3298 3296
  /// replaces each node \f$ u \f$ in the digraph with two nodes,
3299 3297
  /// namely node \f$ u_{in} \f$ and node \f$ u_{out} \f$.
3300 3298
  /// If there is a \f$ (v, u) \f$ arc in the original digraph, then the
3301 3299
  /// new target of the arc will be \f$ u_{in} \f$ and similarly the
3302 3300
  /// source of each original \f$ (u, v) \f$ arc will be \f$ u_{out} \f$.
3303 3301
  /// The adaptor adds an additional \e bind \e arc from \f$ u_{in} \f$
3304 3302
  /// to \f$ u_{out} \f$ for each node \f$ u \f$ of the original digraph.
3305 3303
  ///
3306 3304
  /// The aim of this class is running an algorithm with respect to node
3307 3305
  /// costs or capacities if the algorithm considers only arc costs or
3308 3306
  /// capacities directly.
3309 3307
  /// In this case you can use \c SplitNodes adaptor, and set the node
3310 3308
  /// costs/capacities of the original digraph to the \e bind \e arcs
3311 3309
  /// in the adaptor.
3312 3310
  ///
3313 3311
  /// \tparam DGR The type of the adapted digraph.
3314 3312
  /// It must conform to the \ref concepts::Digraph "Digraph" concept.
3315 3313
  /// It is implicitly \c const.
3316 3314
  ///
3317 3315
  /// \note The \c Node type of this adaptor is converible to the \c Node
3318 3316
  /// type of the adapted digraph.
3319 3317
  template <typename DGR>
3320 3318
#ifdef DOXYGEN
3321 3319
  class SplitNodes {
3322 3320
#else
3323 3321
  class SplitNodes
3324 3322
    : public DigraphAdaptorExtender<SplitNodesBase<const DGR> > {
3325 3323
#endif
3326 3324
  public:
3327 3325
    typedef DGR Digraph;
3328 3326
    typedef DigraphAdaptorExtender<SplitNodesBase<const DGR> > Parent;
3329 3327

	
3330 3328
    typedef typename DGR::Node DigraphNode;
3331 3329
    typedef typename DGR::Arc DigraphArc;
3332 3330

	
3333 3331
    typedef typename Parent::Node Node;
3334 3332
    typedef typename Parent::Arc Arc;
3335 3333

	
3336 3334
    /// \brief Constructor
3337 3335
    ///
3338 3336
    /// Constructor of the adaptor.
3339 3337
    SplitNodes(const DGR& g) {
3340 3338
      Parent::initialize(g);
3341 3339
    }
3342 3340

	
3343 3341
    /// \brief Returns \c true if the given node is an in-node.
3344 3342
    ///
3345 3343
    /// Returns \c true if the given node is an in-node.
3346 3344
    static bool inNode(const Node& n) {
3347 3345
      return Parent::inNode(n);
3348 3346
    }
3349 3347

	
3350 3348
    /// \brief Returns \c true if the given node is an out-node.
3351 3349
    ///
3352 3350
    /// Returns \c true if the given node is an out-node.
3353 3351
    static bool outNode(const Node& n) {
3354 3352
      return Parent::outNode(n);
3355 3353
    }
3356 3354

	
3357 3355
    /// \brief Returns \c true if the given arc is an original arc.
3358 3356
    ///
3359 3357
    /// Returns \c true if the given arc is one of the arcs in the
3360 3358
    /// original digraph.
3361 3359
    static bool origArc(const Arc& a) {
3362 3360
      return Parent::origArc(a);
3363 3361
    }
3364 3362

	
3365 3363
    /// \brief Returns \c true if the given arc is a bind arc.
3366 3364
    ///
3367 3365
    /// Returns \c true if the given arc is a bind arc, i.e. it connects
3368 3366
    /// an in-node and an out-node.
3369 3367
    static bool bindArc(const Arc& a) {
3370 3368
      return Parent::bindArc(a);
3371 3369
    }
3372 3370

	
3373 3371
    /// \brief Returns the in-node created from the given original node.
3374 3372
    ///
3375 3373
    /// Returns the in-node created from the given original node.
3376 3374
    static Node inNode(const DigraphNode& n) {
3377 3375
      return Parent::inNode(n);
3378 3376
    }
3379 3377

	
3380 3378
    /// \brief Returns the out-node created from the given original node.
3381 3379
    ///
3382 3380
    /// Returns the out-node created from the given original node.
3383 3381
    static Node outNode(const DigraphNode& n) {
3384 3382
      return Parent::outNode(n);
3385 3383
    }
3386 3384

	
3387 3385
    /// \brief Returns the bind arc that corresponds to the given
3388 3386
    /// original node.
3389 3387
    ///
3390 3388
    /// Returns the bind arc in the adaptor that corresponds to the given
3391 3389
    /// original node, i.e. the arc connecting the in-node and out-node
3392 3390
    /// of \c n.
3393 3391
    static Arc arc(const DigraphNode& n) {
3394 3392
      return Parent::arc(n);
3395 3393
    }
3396 3394

	
3397 3395
    /// \brief Returns the arc that corresponds to the given original arc.
3398 3396
    ///
3399 3397
    /// Returns the arc in the adaptor that corresponds to the given
3400 3398
    /// original arc.
3401 3399
    static Arc arc(const DigraphArc& a) {
3402 3400
      return Parent::arc(a);
3403 3401
    }
3404 3402

	
3405 3403
    /// \brief Node map combined from two original node maps
3406 3404
    ///
3407 3405
    /// This map adaptor class adapts two node maps of the original digraph
3408 3406
    /// to get a node map of the split digraph.
3409
    /// Its value type is inherited from the first node map type
3410
    /// (\c InNodeMap).
3411
    template <typename InNodeMap, typename OutNodeMap>
3407
    /// Its value type is inherited from the first node map type (\c IN).
3408
    /// \tparam IN The type of the node map for the in-nodes. 
3409
    /// \tparam OUT The type of the node map for the out-nodes.
3410
    template <typename IN, typename OUT>
3412 3411
    class CombinedNodeMap {
3413 3412
    public:
3414 3413

	
3415 3414
      /// The key type of the map
3416 3415
      typedef Node Key;
3417 3416
      /// The value type of the map
3418
      typedef typename InNodeMap::Value Value;
3419

	
3420
      typedef typename MapTraits<InNodeMap>::ReferenceMapTag ReferenceMapTag;
3421
      typedef typename MapTraits<InNodeMap>::ReturnValue ReturnValue;
3422
      typedef typename MapTraits<InNodeMap>::ConstReturnValue ConstReturnValue;
3423
      typedef typename MapTraits<InNodeMap>::ReturnValue Reference;
3424
      typedef typename MapTraits<InNodeMap>::ConstReturnValue ConstReference;
3417
      typedef typename IN::Value Value;
3418

	
3419
      typedef typename MapTraits<IN>::ReferenceMapTag ReferenceMapTag;
3420
      typedef typename MapTraits<IN>::ReturnValue ReturnValue;
3421
      typedef typename MapTraits<IN>::ConstReturnValue ConstReturnValue;
3422
      typedef typename MapTraits<IN>::ReturnValue Reference;
3423
      typedef typename MapTraits<IN>::ConstReturnValue ConstReference;
3425 3424

	
3426 3425
      /// Constructor
3427
      CombinedNodeMap(InNodeMap& in_map, OutNodeMap& out_map)
3426
      CombinedNodeMap(IN& in_map, OUT& out_map)
3428 3427
        : _in_map(in_map), _out_map(out_map) {}
3429 3428

	
3430 3429
      /// Returns the value associated with the given key.
3431 3430
      Value operator[](const Key& key) const {
3432 3431
        if (SplitNodesBase<const DGR>::inNode(key)) {
3433 3432
          return _in_map[key];
3434 3433
        } else {
3435 3434
          return _out_map[key];
3436 3435
        }
3437 3436
      }
3438 3437

	
3439 3438
      /// Returns a reference to the value associated with the given key.
3440 3439
      Value& operator[](const Key& key) {
3441 3440
        if (SplitNodesBase<const DGR>::inNode(key)) {
3442 3441
          return _in_map[key];
3443 3442
        } else {
3444 3443
          return _out_map[key];
3445 3444
        }
3446 3445
      }
3447 3446

	
3448 3447
      /// Sets the value associated with the given key.
3449 3448
      void set(const Key& key, const Value& value) {
3450 3449
        if (SplitNodesBase<const DGR>::inNode(key)) {
3451 3450
          _in_map.set(key, value);
3452 3451
        } else {
3453 3452
          _out_map.set(key, value);
3454 3453
        }
3455 3454
      }
3456 3455

	
3457 3456
    private:
3458 3457

	
3459
      InNodeMap& _in_map;
3460
      OutNodeMap& _out_map;
3458
      IN& _in_map;
3459
      OUT& _out_map;
3461 3460

	
3462 3461
    };
3463 3462

	
3464 3463

	
3465 3464
    /// \brief Returns a combined node map
3466 3465
    ///
3467 3466
    /// This function just returns a combined node map.
3468
    template <typename InNodeMap, typename OutNodeMap>
3469
    static CombinedNodeMap<InNodeMap, OutNodeMap>
3470
    combinedNodeMap(InNodeMap& in_map, OutNodeMap& out_map) {
3471
      return CombinedNodeMap<InNodeMap, OutNodeMap>(in_map, out_map);
3467
    template <typename IN, typename OUT>
3468
    static CombinedNodeMap<IN, OUT>
3469
    combinedNodeMap(IN& in_map, OUT& out_map) {
3470
      return CombinedNodeMap<IN, OUT>(in_map, out_map);
3472 3471
    }
3473 3472

	
3474
    template <typename InNodeMap, typename OutNodeMap>
3475
    static CombinedNodeMap<const InNodeMap, OutNodeMap>
3476
    combinedNodeMap(const InNodeMap& in_map, OutNodeMap& out_map) {
3477
      return CombinedNodeMap<const InNodeMap, OutNodeMap>(in_map, out_map);
3473
    template <typename IN, typename OUT>
3474
    static CombinedNodeMap<const IN, OUT>
3475
    combinedNodeMap(const IN& in_map, OUT& out_map) {
3476
      return CombinedNodeMap<const IN, OUT>(in_map, out_map);
3478 3477
    }
3479 3478

	
3480
    template <typename InNodeMap, typename OutNodeMap>
3481
    static CombinedNodeMap<InNodeMap, const OutNodeMap>
3482
    combinedNodeMap(InNodeMap& in_map, const OutNodeMap& out_map) {
3483
      return CombinedNodeMap<InNodeMap, const OutNodeMap>(in_map, out_map);
3479
    template <typename IN, typename OUT>
3480
    static CombinedNodeMap<IN, const OUT>
3481
    combinedNodeMap(IN& in_map, const OUT& out_map) {
3482
      return CombinedNodeMap<IN, const OUT>(in_map, out_map);
3484 3483
    }
3485 3484

	
3486
    template <typename InNodeMap, typename OutNodeMap>
3487
    static CombinedNodeMap<const InNodeMap, const OutNodeMap>
3488
    combinedNodeMap(const InNodeMap& in_map, const OutNodeMap& out_map) {
3489
      return CombinedNodeMap<const InNodeMap,
3490
        const OutNodeMap>(in_map, out_map);
3485
    template <typename IN, typename OUT>
3486
    static CombinedNodeMap<const IN, const OUT>
3487
    combinedNodeMap(const IN& in_map, const OUT& out_map) {
3488
      return CombinedNodeMap<const IN, const OUT>(in_map, out_map);
3491 3489
    }
3492 3490

	
3493 3491
    /// \brief Arc map combined from an arc map and a node map of the
3494 3492
    /// original digraph.
3495 3493
    ///
3496 3494
    /// This map adaptor class adapts an arc map and a node map of the
3497 3495
    /// original digraph to get an arc map of the split digraph.
3498
    /// Its value type is inherited from the original arc map type
3499
    /// (\c ArcMap).
3500
    template <typename ArcMap, typename NodeMap>
3496
    /// Its value type is inherited from the original arc map type (\c AM).
3497
    /// \tparam AM The type of the arc map.
3498
    /// \tparam NM the type of the node map.
3499
    template <typename AM, typename NM>
3501 3500
    class CombinedArcMap {
3502 3501
    public:
3503 3502

	
3504 3503
      /// The key type of the map
3505 3504
      typedef Arc Key;
3506 3505
      /// The value type of the map
3507
      typedef typename ArcMap::Value Value;
3508

	
3509
      typedef typename MapTraits<ArcMap>::ReferenceMapTag ReferenceMapTag;
3510
      typedef typename MapTraits<ArcMap>::ReturnValue ReturnValue;
3511
      typedef typename MapTraits<ArcMap>::ConstReturnValue ConstReturnValue;
3512
      typedef typename MapTraits<ArcMap>::ReturnValue Reference;
3513
      typedef typename MapTraits<ArcMap>::ConstReturnValue ConstReference;
3506
      typedef typename AM::Value Value;
3507

	
3508
      typedef typename MapTraits<AM>::ReferenceMapTag ReferenceMapTag;
3509
      typedef typename MapTraits<AM>::ReturnValue ReturnValue;
3510
      typedef typename MapTraits<AM>::ConstReturnValue ConstReturnValue;
3511
      typedef typename MapTraits<AM>::ReturnValue Reference;
3512
      typedef typename MapTraits<AM>::ConstReturnValue ConstReference;
3514 3513

	
3515 3514
      /// Constructor
3516
      CombinedArcMap(ArcMap& arc_map, NodeMap& node_map)
3515
      CombinedArcMap(AM& arc_map, NM& node_map)
3517 3516
        : _arc_map(arc_map), _node_map(node_map) {}
3518 3517

	
3519 3518
      /// Returns the value associated with the given key.
3520 3519
      Value operator[](const Key& arc) const {
3521 3520
        if (SplitNodesBase<const DGR>::origArc(arc)) {
3522 3521
          return _arc_map[arc];
3523 3522
        } else {
3524 3523
          return _node_map[arc];
3525 3524
        }
3526 3525
      }
3527 3526

	
3528 3527
      /// Returns a reference to the value associated with the given key.
3529 3528
      Value& operator[](const Key& arc) {
3530 3529
        if (SplitNodesBase<const DGR>::origArc(arc)) {
3531 3530
          return _arc_map[arc];
3532 3531
        } else {
3533 3532
          return _node_map[arc];
3534 3533
        }
3535 3534
      }
3536 3535

	
3537 3536
      /// Sets the value associated with the given key.
3538 3537
      void set(const Arc& arc, const Value& val) {
3539 3538
        if (SplitNodesBase<const DGR>::origArc(arc)) {
3540 3539
          _arc_map.set(arc, val);
3541 3540
        } else {
3542 3541
          _node_map.set(arc, val);
3543 3542
        }
3544 3543
      }
3545 3544

	
3546 3545
    private:
3547
      ArcMap& _arc_map;
3548
      NodeMap& _node_map;
3546

	
3547
      AM& _arc_map;
3548
      NM& _node_map;
3549

	
3549 3550
    };
3550 3551

	
3551 3552
    /// \brief Returns a combined arc map
3552 3553
    ///
3553 3554
    /// This function just returns a combined arc map.
3554 3555
    template <typename ArcMap, typename NodeMap>
3555 3556
    static CombinedArcMap<ArcMap, NodeMap>
3556 3557
    combinedArcMap(ArcMap& arc_map, NodeMap& node_map) {
3557 3558
      return CombinedArcMap<ArcMap, NodeMap>(arc_map, node_map);
3558 3559
    }
3559 3560

	
3560 3561
    template <typename ArcMap, typename NodeMap>
3561 3562
    static CombinedArcMap<const ArcMap, NodeMap>
3562 3563
    combinedArcMap(const ArcMap& arc_map, NodeMap& node_map) {
3563 3564
      return CombinedArcMap<const ArcMap, NodeMap>(arc_map, node_map);
3564 3565
    }
3565 3566

	
3566 3567
    template <typename ArcMap, typename NodeMap>
3567 3568
    static CombinedArcMap<ArcMap, const NodeMap>
3568 3569
    combinedArcMap(ArcMap& arc_map, const NodeMap& node_map) {
3569 3570
      return CombinedArcMap<ArcMap, const NodeMap>(arc_map, node_map);
3570 3571
    }
3571 3572

	
3572 3573
    template <typename ArcMap, typename NodeMap>
3573 3574
    static CombinedArcMap<const ArcMap, const NodeMap>
3574 3575
    combinedArcMap(const ArcMap& arc_map, const NodeMap& node_map) {
3575 3576
      return CombinedArcMap<const ArcMap, const NodeMap>(arc_map, node_map);
3576 3577
    }
3577 3578

	
3578 3579
  };
3579 3580

	
3580 3581
  /// \brief Returns a (read-only) SplitNodes adaptor
3581 3582
  ///
3582 3583
  /// This function just returns a (read-only) \ref SplitNodes adaptor.
3583 3584
  /// \ingroup graph_adaptors
3584 3585
  /// \relates SplitNodes
3585 3586
  template<typename DGR>
3586 3587
  SplitNodes<DGR>
3587 3588
  splitNodes(const DGR& digraph) {
3588 3589
    return SplitNodes<DGR>(digraph);
3589 3590
  }
3590 3591

	
3591 3592
#undef LEMON_SCOPE_FIX
3592 3593

	
3593 3594
} //namespace lemon
3594 3595

	
3595 3596
#endif //LEMON_ADAPTORS_H
Ignore white space 3072 line context
1 1
/* -*- mode: C++; indent-tabs-mode: nil; -*-
2 2
 *
3 3
 * This file is a part of LEMON, a generic C++ optimization library.
4 4
 *
5 5
 * Copyright (C) 2003-2009
6 6
 * Egervary Jeno Kombinatorikus Optimalizalasi Kutatocsoport
7 7
 * (Egervary Research Group on Combinatorial Optimization, EGRES).
8 8
 *
9 9
 * Permission to use, modify and distribute this software is granted
10 10
 * provided that this copyright notice appears in all copies. For
11 11
 * precise terms see the accompanying LICENSE file.
12 12
 *
13 13
 * This software is provided "AS IS" with no warranty of any kind,
14 14
 * express or implied, and with no claim as to its suitability for any
15 15
 * purpose.
16 16
 *
17 17
 */
18 18

	
19 19
#ifndef LEMON_BIN_HEAP_H
20 20
#define LEMON_BIN_HEAP_H
21 21

	
22 22
///\ingroup auxdat
23 23
///\file
24 24
///\brief Binary Heap implementation.
25 25

	
26 26
#include <vector>
27 27
#include <utility>
28 28
#include <functional>
29 29

	
30 30
namespace lemon {
31 31

	
32 32
  ///\ingroup auxdat
33 33
  ///
34 34
  ///\brief A Binary Heap implementation.
35 35
  ///
36
  ///This class implements the \e binary \e heap data structure. A \e heap
37
  ///is a data structure for storing items with specified values called \e
38
  ///priorities in such a way that finding the item with minimum priority is
39
  ///efficient. \c Compare specifies the ordering of the priorities. In a heap
40
  ///one can change the priority of an item, add or erase an item, etc.
36
  ///This class implements the \e binary \e heap data structure. 
37
  /// 
38
  ///A \e heap is a data structure for storing items with specified values
39
  ///called \e priorities in such a way that finding the item with minimum
40
  ///priority is efficient. \c Comp specifies the ordering of the priorities.
41
  ///In a heap one can change the priority of an item, add or erase an
42
  ///item, etc.
41 43
  ///
42
  ///\tparam _Prio Type of the priority of the items.
43
  ///\tparam _ItemIntMap A read and writable Item int map, used internally
44
  ///\tparam PR Type of the priority of the items.
45
  ///\tparam IM A read and writable item map with int values, used internally
44 46
  ///to handle the cross references.
45
  ///\tparam _Compare A class for the ordering of the priorities. The
46
  ///default is \c std::less<_Prio>.
47
  ///\tparam Comp A functor class for the ordering of the priorities.
48
  ///The default is \c std::less<PR>.
47 49
  ///
48 50
  ///\sa FibHeap
49 51
  ///\sa Dijkstra
50
  template <typename _Prio, typename _ItemIntMap,
51
            typename _Compare = std::less<_Prio> >
52
  template <typename PR, typename IM, typename Comp = std::less<PR> >
52 53
  class BinHeap {
53 54

	
54 55
  public:
55 56
    ///\e
56
    typedef _ItemIntMap ItemIntMap;
57
    typedef IM ItemIntMap;
57 58
    ///\e
58
    typedef _Prio Prio;
59
    typedef PR Prio;
59 60
    ///\e
60 61
    typedef typename ItemIntMap::Key Item;
61 62
    ///\e
62 63
    typedef std::pair<Item,Prio> Pair;
63 64
    ///\e
64
    typedef _Compare Compare;
65
    typedef Comp Compare;
65 66

	
66 67
    /// \brief Type to represent the items states.
67 68
    ///
68 69
    /// Each Item element have a state associated to it. It may be "in heap",
69 70
    /// "pre heap" or "post heap". The latter two are indifferent from the
70 71
    /// heap's point of view, but may be useful to the user.
71 72
    ///
72
    /// The ItemIntMap \e should be initialized in such way that it maps
73
    /// PRE_HEAP (-1) to any element to be put in the heap...
73
    /// The item-int map must be initialized in such way that it assigns
74
    /// \c PRE_HEAP (<tt>-1</tt>) to any element to be put in the heap.
74 75
    enum State {
75
      IN_HEAP = 0,
76
      PRE_HEAP = -1,
77
      POST_HEAP = -2
76
      IN_HEAP = 0,    ///< \e
77
      PRE_HEAP = -1,  ///< \e
78
      POST_HEAP = -2  ///< \e
78 79
    };
79 80

	
80 81
  private:
81
    std::vector<Pair> data;
82
    Compare comp;
83
    ItemIntMap &iim;
82
    std::vector<Pair> _data;
83
    Compare _comp;
84
    ItemIntMap &_iim;
84 85

	
85 86
  public:
86 87
    /// \brief The constructor.
87 88
    ///
88 89
    /// The constructor.
89
    /// \param _iim should be given to the constructor, since it is used
90
    /// \param map should be given to the constructor, since it is used
90 91
    /// internally to handle the cross references. The value of the map
91
    /// should be PRE_HEAP (-1) for each element.
92
    explicit BinHeap(ItemIntMap &_iim) : iim(_iim) {}
92
    /// must be \c PRE_HEAP (<tt>-1</tt>) for every item.
93
    explicit BinHeap(ItemIntMap &map) : _iim(map) {}
93 94

	
94 95
    /// \brief The constructor.
95 96
    ///
96 97
    /// The constructor.
97
    /// \param _iim should be given to the constructor, since it is used
98
    /// \param map should be given to the constructor, since it is used
98 99
    /// internally to handle the cross references. The value of the map
99 100
    /// should be PRE_HEAP (-1) for each element.
100 101
    ///
101
    /// \param _comp The comparator function object.
102
    BinHeap(ItemIntMap &_iim, const Compare &_comp)
103
      : iim(_iim), comp(_comp) {}
102
    /// \param comp The comparator function object.
103
    BinHeap(ItemIntMap &map, const Compare &comp)
104
      : _iim(map), _comp(comp) {}
104 105

	
105 106

	
106 107
    /// The number of items stored in the heap.
107 108
    ///
108 109
    /// \brief Returns the number of items stored in the heap.
109
    int size() const { return data.size(); }
110
    int size() const { return _data.size(); }
110 111

	
111 112
    /// \brief Checks if the heap stores no items.
112 113
    ///
113 114
    /// Returns \c true if and only if the heap stores no items.
114
    bool empty() const { return data.empty(); }
115
    bool empty() const { return _data.empty(); }
115 116

	
116 117
    /// \brief Make empty this heap.
117 118
    ///
118 119
    /// Make empty this heap. It does not change the cross reference map.
119 120
    /// If you want to reuse what is not surely empty you should first clear
120 121
    /// the heap and after that you should set the cross reference map for
121 122
    /// each item to \c PRE_HEAP.
122 123
    void clear() {
123
      data.clear();
124
      _data.clear();
124 125
    }
125 126

	
126 127
  private:
127 128
    static int parent(int i) { return (i-1)/2; }
128 129

	
129 130
    static int second_child(int i) { return 2*i+2; }
130 131
    bool less(const Pair &p1, const Pair &p2) const {
131
      return comp(p1.second, p2.second);
132
      return _comp(p1.second, p2.second);
132 133
    }
133 134

	
134 135
    int bubble_up(int hole, Pair p) {
135 136
      int par = parent(hole);
136
      while( hole>0 && less(p,data[par]) ) {
137
        move(data[par],hole);
137
      while( hole>0 && less(p,_data[par]) ) {
138
        move(_data[par],hole);
138 139
        hole = par;
139 140
        par = parent(hole);
140 141
      }
141 142
      move(p, hole);
142 143
      return hole;
143 144
    }
144 145

	
145 146
    int bubble_down(int hole, Pair p, int length) {
146 147
      int child = second_child(hole);
147 148
      while(child < length) {
148
        if( less(data[child-1], data[child]) ) {
149
        if( less(_data[child-1], _data[child]) ) {
149 150
          --child;
150 151
        }
151
        if( !less(data[child], p) )
152
        if( !less(_data[child], p) )
152 153
          goto ok;
153
        move(data[child], hole);
154
        move(_data[child], hole);
154 155
        hole = child;
155 156
        child = second_child(hole);
156 157
      }
157 158
      child--;
158
      if( child<length && less(data[child], p) ) {
159
        move(data[child], hole);
159
      if( child<length && less(_data[child], p) ) {
160
        move(_data[child], hole);
160 161
        hole=child;
161 162
      }
162 163
    ok:
163 164
      move(p, hole);
164 165
      return hole;
165 166
    }
166 167

	
167 168
    void move(const Pair &p, int i) {
168
      data[i] = p;
169
      iim.set(p.first, i);
169
      _data[i] = p;
170
      _iim.set(p.first, i);
170 171
    }
171 172

	
172 173
  public:
173 174
    /// \brief Insert a pair of item and priority into the heap.
174 175
    ///
175 176
    /// Adds \c p.first to the heap with priority \c p.second.
176 177
    /// \param p The pair to insert.
177 178
    void push(const Pair &p) {
178
      int n = data.size();
179
      data.resize(n+1);
179
      int n = _data.size();
180
      _data.resize(n+1);
180 181
      bubble_up(n, p);
181 182
    }
182 183

	
183 184
    /// \brief Insert an item into the heap with the given heap.
184 185
    ///
185 186
    /// Adds \c i to the heap with priority \c p.
186 187
    /// \param i The item to insert.
187 188
    /// \param p The priority of the item.
188 189
    void push(const Item &i, const Prio &p) { push(Pair(i,p)); }
189 190

	
190 191
    /// \brief Returns the item with minimum priority relative to \c Compare.
191 192
    ///
192 193
    /// This method returns the item with minimum priority relative to \c
193 194
    /// Compare.
194 195
    /// \pre The heap must be nonempty.
195 196
    Item top() const {
196
      return data[0].first;
197
      return _data[0].first;
197 198
    }
198 199

	
199 200
    /// \brief Returns the minimum priority relative to \c Compare.
200 201
    ///
201 202
    /// It returns the minimum priority relative to \c Compare.
202 203
    /// \pre The heap must be nonempty.
203 204
    Prio prio() const {
204
      return data[0].second;
205
      return _data[0].second;
205 206
    }
206 207

	
207 208
    /// \brief Deletes the item with minimum priority relative to \c Compare.
208 209
    ///
209 210
    /// This method deletes the item with minimum priority relative to \c
210 211
    /// Compare from the heap.
211 212
    /// \pre The heap must be non-empty.
212 213
    void pop() {
213
      int n = data.size()-1;
214
      iim.set(data[0].first, POST_HEAP);
214
      int n = _data.size()-1;
215
      _iim.set(_data[0].first, POST_HEAP);
215 216
      if (n > 0) {
216
        bubble_down(0, data[n], n);
217
        bubble_down(0, _data[n], n);
217 218
      }
218
      data.pop_back();
219
      _data.pop_back();
219 220
    }
220 221

	
221 222
    /// \brief Deletes \c i from the heap.
222 223
    ///
223 224
    /// This method deletes item \c i from the heap.
224 225
    /// \param i The item to erase.
225 226
    /// \pre The item should be in the heap.
226 227
    void erase(const Item &i) {
227
      int h = iim[i];
228
      int n = data.size()-1;
229
      iim.set(data[h].first, POST_HEAP);
228
      int h = _iim[i];
229
      int n = _data.size()-1;
230
      _iim.set(_data[h].first, POST_HEAP);
230 231
      if( h < n ) {
231
        if ( bubble_up(h, data[n]) == h) {
232
          bubble_down(h, data[n], n);
232
        if ( bubble_up(h, _data[n]) == h) {
233
          bubble_down(h, _data[n], n);
233 234
        }
234 235
      }
235
      data.pop_back();
236
      _data.pop_back();
236 237
    }
237 238

	
238 239

	
239 240
    /// \brief Returns the priority of \c i.
240 241
    ///
241 242
    /// This function returns the priority of item \c i.
243
    /// \param i The item.
242 244
    /// \pre \c i must be in the heap.
243
    /// \param i The item.
244 245
    Prio operator[](const Item &i) const {
245
      int idx = iim[i];
246
      return data[idx].second;
246
      int idx = _iim[i];
247
      return _data[idx].second;
247 248
    }
248 249

	
249 250
    /// \brief \c i gets to the heap with priority \c p independently
250 251
    /// if \c i was already there.
251 252
    ///
252 253
    /// This method calls \ref push(\c i, \c p) if \c i is not stored
253 254
    /// in the heap and sets the priority of \c i to \c p otherwise.
254 255
    /// \param i The item.
255 256
    /// \param p The priority.
256 257
    void set(const Item &i, const Prio &p) {
257
      int idx = iim[i];
258
      int idx = _iim[i];
258 259
      if( idx < 0 ) {
259 260
        push(i,p);
260 261
      }
261
      else if( comp(p, data[idx].second) ) {
262
      else if( _comp(p, _data[idx].second) ) {
262 263
        bubble_up(idx, Pair(i,p));
263 264
      }
264 265
      else {
265
        bubble_down(idx, Pair(i,p), data.size());
266
        bubble_down(idx, Pair(i,p), _data.size());
266 267
      }
267 268
    }
268 269

	
269 270
    /// \brief Decreases the priority of \c i to \c p.
270 271
    ///
271 272
    /// This method decreases the priority of item \c i to \c p.
273
    /// \param i The item.
274
    /// \param p The priority.
272 275
    /// \pre \c i must be stored in the heap with priority at least \c
273 276
    /// p relative to \c Compare.
274
    /// \param i The item.
275
    /// \param p The priority.
276 277
    void decrease(const Item &i, const Prio &p) {
277
      int idx = iim[i];
278
      int idx = _iim[i];
278 279
      bubble_up(idx, Pair(i,p));
279 280
    }
280 281

	
281 282
    /// \brief Increases the priority of \c i to \c p.
282 283
    ///
283 284
    /// This method sets the priority of item \c i to \c p.
285
    /// \param i The item.
286
    /// \param p The priority.
284 287
    /// \pre \c i must be stored in the heap with priority at most \c
285 288
    /// p relative to \c Compare.
286
    /// \param i The item.
287
    /// \param p The priority.
288 289
    void increase(const Item &i, const Prio &p) {
289
      int idx = iim[i];
290
      bubble_down(idx, Pair(i,p), data.size());
290
      int idx = _iim[i];
291
      bubble_down(idx, Pair(i,p), _data.size());
291 292
    }
292 293

	
293 294
    /// \brief Returns if \c item is in, has already been in, or has
294 295
    /// never been in the heap.
295 296
    ///
296 297
    /// This method returns PRE_HEAP if \c item has never been in the
297 298
    /// heap, IN_HEAP if it is in the heap at the moment, and POST_HEAP
298 299
    /// otherwise. In the latter case it is possible that \c item will
299 300
    /// get back to the heap again.
300 301
    /// \param i The item.
301 302
    State state(const Item &i) const {
302
      int s = iim[i];
303
      int s = _iim[i];
303 304
      if( s>=0 )
304 305
        s=0;
305 306
      return State(s);
306 307
    }
307 308

	
308 309
    /// \brief Sets the state of the \c item in the heap.
309 310
    ///
310 311
    /// Sets the state of the \c item in the heap. It can be used to
311 312
    /// manually clear the heap when it is important to achive the
312 313
    /// better time complexity.
313 314
    /// \param i The item.
314 315
    /// \param st The state. It should not be \c IN_HEAP.
315 316
    void state(const Item& i, State st) {
316 317
      switch (st) {
317 318
      case POST_HEAP:
318 319
      case PRE_HEAP:
319 320
        if (state(i) == IN_HEAP) {
320 321
          erase(i);
321 322
        }
322
        iim[i] = st;
323
        _iim[i] = st;
323 324
        break;
324 325
      case IN_HEAP:
325 326
        break;
326 327
      }
327 328
    }
328 329

	
329 330
    /// \brief Replaces an item in the heap.
330 331
    ///
331 332
    /// The \c i item is replaced with \c j item. The \c i item should
332 333
    /// be in the heap, while the \c j should be out of the heap. The
333 334
    /// \c i item will out of the heap and \c j will be in the heap
334 335
    /// with the same prioriority as prevoiusly the \c i item.
335 336
    void replace(const Item& i, const Item& j) {
336
      int idx = iim[i];
337
      iim.set(i, iim[j]);
338
      iim.set(j, idx);
339
      data[idx].first = j;
337
      int idx = _iim[i];
338
      _iim.set(i, _iim[j]);
339
      _iim.set(j, idx);
340
      _data[idx].first = j;
340 341
    }
341 342

	
342 343
  }; // class BinHeap
343 344

	
344 345
} // namespace lemon
345 346

	
346 347
#endif // LEMON_BIN_HEAP_H
Ignore white space 3072 line context
1 1
/* -*- C++ -*-
2 2
 *
3 3
 * This file is a part of LEMON, a generic C++ optimization library
4 4
 *
5 5
 * Copyright (C) 2003-2008
6 6
 * Egervary Jeno Kombinatorikus Optimalizalasi Kutatocsoport
7 7
 * (Egervary Research Group on Combinatorial Optimization, EGRES).
8 8
 *
9 9
 * Permission to use, modify and distribute this software is granted
10 10
 * provided that this copyright notice appears in all copies. For
11 11
 * precise terms see the accompanying LICENSE file.
12 12
 *
13 13
 * This software is provided "AS IS" with no warranty of any kind,
14 14
 * express or implied, and with no claim as to its suitability for any
15 15
 * purpose.
16 16
 *
17 17
 */
18 18

	
19 19
#ifndef LEMON_BITS_EDGE_SET_EXTENDER_H
20 20
#define LEMON_BITS_EDGE_SET_EXTENDER_H
21 21

	
22 22
#include <lemon/core.h>
23 23
#include <lemon/error.h>
24 24
#include <lemon/bits/default_map.h>
25 25
#include <lemon/bits/map_extender.h>
26 26

	
27
///\ingroup digraphbits
28
///\file
29
///\brief Extenders for the arc set types
27
//\ingroup digraphbits
28
//\file
29
//\brief Extenders for the arc set types
30 30
namespace lemon {
31 31

	
32
  /// \ingroup digraphbits
33
  ///
34
  /// \brief Extender for the ArcSets
32
  // \ingroup digraphbits
33
  //
34
  // \brief Extender for the ArcSets
35 35
  template <typename Base>
36 36
  class ArcSetExtender : public Base {
37 37
  public:
38 38

	
39 39
    typedef Base Parent;
40 40
    typedef ArcSetExtender Digraph;
41 41

	
42 42
    // Base extensions
43 43

	
44 44
    typedef typename Parent::Node Node;
45 45
    typedef typename Parent::Arc Arc;
46 46

	
47 47
    int maxId(Node) const {
48 48
      return Parent::maxNodeId();
49 49
    }
50 50

	
51 51
    int maxId(Arc) const {
52 52
      return Parent::maxArcId();
53 53
    }
54 54

	
55 55
    Node fromId(int id, Node) const {
56 56
      return Parent::nodeFromId(id);
57 57
    }
58 58

	
59 59
    Arc fromId(int id, Arc) const {
60 60
      return Parent::arcFromId(id);
61 61
    }
62 62

	
63 63
    Node oppositeNode(const Node &n, const Arc &e) const {
64 64
      if (n == Parent::source(e))
65 65
	return Parent::target(e);
66 66
      else if(n==Parent::target(e))
67 67
	return Parent::source(e);
68 68
      else
69 69
	return INVALID;
70 70
    }
71 71

	
72 72

	
73 73
    // Alteration notifier extensions
74 74

	
75
    /// The arc observer registry.
75
    // The arc observer registry.
76 76
    typedef AlterationNotifier<ArcSetExtender, Arc> ArcNotifier;
77 77

	
78 78
  protected:
79 79

	
80 80
    mutable ArcNotifier arc_notifier;
81 81

	
82 82
  public:
83 83

	
84 84
    using Parent::notifier;
85 85

	
86
    /// \brief Gives back the arc alteration notifier.
87
    ///
88
    /// Gives back the arc alteration notifier.
86
    // Gives back the arc alteration notifier.
89 87
    ArcNotifier& notifier(Arc) const {
90 88
      return arc_notifier;
91 89
    }
92 90

	
93 91
    // Iterable extensions
94 92

	
95 93
    class NodeIt : public Node { 
96 94
      const Digraph* digraph;
97 95
    public:
98 96

	
99 97
      NodeIt() {}
100 98

	
101 99
      NodeIt(Invalid i) : Node(i) { }
102 100

	
103 101
      explicit NodeIt(const Digraph& _graph) : digraph(&_graph) {
104 102
	_graph.first(static_cast<Node&>(*this));
105 103
      }
106 104

	
107 105
      NodeIt(const Digraph& _graph, const Node& node) 
108 106
	: Node(node), digraph(&_graph) {}
109 107

	
110 108
      NodeIt& operator++() { 
111 109
	digraph->next(*this);
112 110
	return *this; 
113 111
      }
114 112

	
115 113
    };
116 114

	
117 115

	
118 116
    class ArcIt : public Arc { 
119 117
      const Digraph* digraph;
120 118
    public:
121 119

	
122 120
      ArcIt() { }
123 121

	
124 122
      ArcIt(Invalid i) : Arc(i) { }
125 123

	
126 124
      explicit ArcIt(const Digraph& _graph) : digraph(&_graph) {
127 125
	_graph.first(static_cast<Arc&>(*this));
128 126
      }
129 127

	
130 128
      ArcIt(const Digraph& _graph, const Arc& e) : 
131 129
	Arc(e), digraph(&_graph) { }
132 130

	
133 131
      ArcIt& operator++() { 
134 132
	digraph->next(*this);
135 133
	return *this; 
136 134
      }
137 135

	
138 136
    };
139 137

	
140 138

	
141 139
    class OutArcIt : public Arc { 
142 140
      const Digraph* digraph;
143 141
    public:
144 142

	
145 143
      OutArcIt() { }
146 144

	
147 145
      OutArcIt(Invalid i) : Arc(i) { }
148 146

	
149 147
      OutArcIt(const Digraph& _graph, const Node& node) 
150 148
	: digraph(&_graph) {
151 149
	_graph.firstOut(*this, node);
152 150
      }
153 151

	
154 152
      OutArcIt(const Digraph& _graph, const Arc& arc) 
155 153
	: Arc(arc), digraph(&_graph) {}
156 154

	
157 155
      OutArcIt& operator++() { 
158 156
	digraph->nextOut(*this);
159 157
	return *this; 
160 158
      }
161 159

	
162 160
    };
163 161

	
164 162

	
165 163
    class InArcIt : public Arc { 
166 164
      const Digraph* digraph;
167 165
    public:
168 166

	
169 167
      InArcIt() { }
170 168

	
171 169
      InArcIt(Invalid i) : Arc(i) { }
172 170

	
173 171
      InArcIt(const Digraph& _graph, const Node& node) 
174 172
	: digraph(&_graph) {
175 173
	_graph.firstIn(*this, node);
176 174
      }
177 175

	
178 176
      InArcIt(const Digraph& _graph, const Arc& arc) : 
179 177
	Arc(arc), digraph(&_graph) {}
180 178

	
181 179
      InArcIt& operator++() { 
182 180
	digraph->nextIn(*this);
183 181
	return *this; 
184 182
      }
185 183

	
186 184
    };
187 185

	
188
    /// \brief Base node of the iterator
189
    ///
190
    /// Returns the base node (ie. the source in this case) of the iterator
186
    // \brief Base node of the iterator
187
    //
188
    // Returns the base node (ie. the source in this case) of the iterator
191 189
    Node baseNode(const OutArcIt &e) const {
192 190
      return Parent::source(static_cast<const Arc&>(e));
193 191
    }
194
    /// \brief Running node of the iterator
195
    ///
196
    /// Returns the running node (ie. the target in this case) of the
197
    /// iterator
192
    // \brief Running node of the iterator
193
    //
194
    // Returns the running node (ie. the target in this case) of the
195
    // iterator
198 196
    Node runningNode(const OutArcIt &e) const {
199 197
      return Parent::target(static_cast<const Arc&>(e));
200 198
    }
201 199

	
202
    /// \brief Base node of the iterator
203
    ///
204
    /// Returns the base node (ie. the target in this case) of the iterator
200
    // \brief Base node of the iterator
201
    //
202
    // Returns the base node (ie. the target in this case) of the iterator
205 203
    Node baseNode(const InArcIt &e) const {
206 204
      return Parent::target(static_cast<const Arc&>(e));
207 205
    }
208
    /// \brief Running node of the iterator
209
    ///
210
    /// Returns the running node (ie. the source in this case) of the
211
    /// iterator
206
    // \brief Running node of the iterator
207
    //
208
    // Returns the running node (ie. the source in this case) of the
209
    // iterator
212 210
    Node runningNode(const InArcIt &e) const {
213 211
      return Parent::source(static_cast<const Arc&>(e));
214 212
    }
215 213

	
216 214
    using Parent::first;
217 215

	
218 216
    // Mappable extension
219 217
    
220 218
    template <typename _Value>
221 219
    class ArcMap 
222 220
      : public MapExtender<DefaultMap<Digraph, Arc, _Value> > {
223 221
    public:
224 222
      typedef ArcSetExtender Digraph;
225 223
      typedef MapExtender<DefaultMap<Digraph, Arc, _Value> > Parent;
226 224

	
227 225
      explicit ArcMap(const Digraph& _g) 
228 226
	: Parent(_g) {}
229 227
      ArcMap(const Digraph& _g, const _Value& _v) 
230 228
	: Parent(_g, _v) {}
231 229

	
232 230
      ArcMap& operator=(const ArcMap& cmap) {
233 231
	return operator=<ArcMap>(cmap);
234 232
      }
235 233

	
236 234
      template <typename CMap>
237 235
      ArcMap& operator=(const CMap& cmap) {
238 236
        Parent::operator=(cmap);
239 237
	return *this;
240 238
      }
241 239

	
242 240
    };
243 241

	
244 242

	
245 243
    // Alteration extension
246 244

	
247 245
    Arc addArc(const Node& from, const Node& to) {
248 246
      Arc arc = Parent::addArc(from, to);
249 247
      notifier(Arc()).add(arc);
250 248
      return arc;
251 249
    }
252 250
    
253 251
    void clear() {
254 252
      notifier(Arc()).clear();
255 253
      Parent::clear();
256 254
    }
257 255

	
258 256
    void erase(const Arc& arc) {
259 257
      notifier(Arc()).erase(arc);
260 258
      Parent::erase(arc);
261 259
    }
262 260

	
263 261
    ArcSetExtender() {
264 262
      arc_notifier.setContainer(*this);
265 263
    }
266 264

	
267 265
    ~ArcSetExtender() {
268 266
      arc_notifier.clear();
269 267
    }
270 268

	
271 269
  };
272 270

	
273 271

	
274
  /// \ingroup digraphbits
275
  ///
276
  /// \brief Extender for the EdgeSets
272
  // \ingroup digraphbits
273
  //
274
  // \brief Extender for the EdgeSets
277 275
  template <typename Base>
278 276
  class EdgeSetExtender : public Base {
279 277

	
280 278
  public:
281 279

	
282 280
    typedef Base Parent;
283 281
    typedef EdgeSetExtender Digraph;
284 282

	
285 283
    typedef typename Parent::Node Node;
286 284
    typedef typename Parent::Arc Arc;
287 285
    typedef typename Parent::Edge Edge;
288 286

	
289 287

	
290 288
    int maxId(Node) const {
291 289
      return Parent::maxNodeId();
292 290
    }
293 291

	
294 292
    int maxId(Arc) const {
295 293
      return Parent::maxArcId();
296 294
    }
297 295

	
298 296
    int maxId(Edge) const {
299 297
      return Parent::maxEdgeId();
300 298
    }
301 299

	
302 300
    Node fromId(int id, Node) const {
303 301
      return Parent::nodeFromId(id);
304 302
    }
305 303

	
306 304
    Arc fromId(int id, Arc) const {
307 305
      return Parent::arcFromId(id);
308 306
    }
309 307

	
310 308
    Edge fromId(int id, Edge) const {
311 309
      return Parent::edgeFromId(id);
312 310
    }
313 311

	
314 312
    Node oppositeNode(const Node &n, const Edge &e) const {
315 313
      if( n == Parent::u(e))
316 314
	return Parent::v(e);
317 315
      else if( n == Parent::v(e))
318 316
	return Parent::u(e);
319 317
      else
320 318
	return INVALID;
321 319
    }
322 320

	
323 321
    Arc oppositeArc(const Arc &e) const {
324 322
      return Parent::direct(e, !Parent::direction(e));
325 323
    }
326 324

	
327 325
    using Parent::direct;
328 326
    Arc direct(const Edge &e, const Node &s) const {
329 327
      return Parent::direct(e, Parent::u(e) == s);
330 328
    }
331 329

	
332 330
    typedef AlterationNotifier<EdgeSetExtender, Arc> ArcNotifier;
333 331
    typedef AlterationNotifier<EdgeSetExtender, Edge> EdgeNotifier;
334 332

	
335 333

	
336 334
  protected:
337 335

	
338 336
    mutable ArcNotifier arc_notifier;
339 337
    mutable EdgeNotifier edge_notifier;
340 338

	
341 339
  public:
342 340

	
343 341
    using Parent::notifier;
344 342
    
345 343
    ArcNotifier& notifier(Arc) const {
346 344
      return arc_notifier;
347 345
    }
348 346

	
349 347
    EdgeNotifier& notifier(Edge) const {
350 348
      return edge_notifier;
351 349
    }
352 350

	
353 351

	
354 352
    class NodeIt : public Node { 
355 353
      const Digraph* digraph;
356 354
    public:
357 355

	
358 356
      NodeIt() {}
359 357

	
360 358
      NodeIt(Invalid i) : Node(i) { }
361 359

	
362 360
      explicit NodeIt(const Digraph& _graph) : digraph(&_graph) {
363 361
	_graph.first(static_cast<Node&>(*this));
364 362
      }
365 363

	
366 364
      NodeIt(const Digraph& _graph, const Node& node) 
367 365
	: Node(node), digraph(&_graph) {}
368 366

	
369 367
      NodeIt& operator++() { 
370 368
	digraph->next(*this);
371 369
	return *this; 
372 370
      }
373 371

	
374 372
    };
375 373

	
376 374

	
377 375
    class ArcIt : public Arc { 
378 376
      const Digraph* digraph;
379 377
    public:
380 378

	
381 379
      ArcIt() { }
382 380

	
383 381
      ArcIt(Invalid i) : Arc(i) { }
384 382

	
385 383
      explicit ArcIt(const Digraph& _graph) : digraph(&_graph) {
386 384
	_graph.first(static_cast<Arc&>(*this));
387 385
      }
388 386

	
389 387
      ArcIt(const Digraph& _graph, const Arc& e) : 
390 388
	Arc(e), digraph(&_graph) { }
391 389

	
392 390
      ArcIt& operator++() { 
393 391
	digraph->next(*this);
394 392
	return *this; 
395 393
      }
396 394

	
397 395
    };
398 396

	
399 397

	
400 398
    class OutArcIt : public Arc { 
401 399
      const Digraph* digraph;
402 400
    public:
403 401

	
404 402
      OutArcIt() { }
405 403

	
406 404
      OutArcIt(Invalid i) : Arc(i) { }
407 405

	
408 406
      OutArcIt(const Digraph& _graph, const Node& node) 
409 407
	: digraph(&_graph) {
410 408
	_graph.firstOut(*this, node);
411 409
      }
412 410

	
413 411
      OutArcIt(const Digraph& _graph, const Arc& arc) 
414 412
	: Arc(arc), digraph(&_graph) {}
415 413

	
416 414
      OutArcIt& operator++() { 
417 415
	digraph->nextOut(*this);
418 416
	return *this; 
419 417
      }
420 418

	
421 419
    };
422 420

	
423 421

	
424 422
    class InArcIt : public Arc { 
425 423
      const Digraph* digraph;
426 424
    public:
427 425

	
428 426
      InArcIt() { }
429 427

	
430 428
      InArcIt(Invalid i) : Arc(i) { }
431 429

	
432 430
      InArcIt(const Digraph& _graph, const Node& node) 
433 431
	: digraph(&_graph) {
434 432
	_graph.firstIn(*this, node);
435 433
      }
436 434

	
437 435
      InArcIt(const Digraph& _graph, const Arc& arc) : 
438 436
	Arc(arc), digraph(&_graph) {}
439 437

	
440 438
      InArcIt& operator++() { 
441 439
	digraph->nextIn(*this);
442 440
	return *this; 
443 441
      }
444 442

	
445 443
    };
446 444

	
447 445

	
448 446
    class EdgeIt : public Parent::Edge { 
449 447
      const Digraph* digraph;
450 448
    public:
451 449

	
452 450
      EdgeIt() { }
453 451

	
454 452
      EdgeIt(Invalid i) : Edge(i) { }
455 453

	
456 454
      explicit EdgeIt(const Digraph& _graph) : digraph(&_graph) {
457 455
	_graph.first(static_cast<Edge&>(*this));
458 456
      }
459 457

	
460 458
      EdgeIt(const Digraph& _graph, const Edge& e) : 
461 459
	Edge(e), digraph(&_graph) { }
462 460

	
463 461
      EdgeIt& operator++() { 
464 462
	digraph->next(*this);
465 463
	return *this; 
466 464
      }
467 465

	
468 466
    };
469 467

	
470 468
    class IncEdgeIt : public Parent::Edge {
471 469
      friend class EdgeSetExtender;
472 470
      const Digraph* digraph;
473 471
      bool direction;
474 472
    public:
475 473

	
476 474
      IncEdgeIt() { }
477 475

	
478 476
      IncEdgeIt(Invalid i) : Edge(i), direction(false) { }
479 477

	
480 478
      IncEdgeIt(const Digraph& _graph, const Node &n) : digraph(&_graph) {
481 479
	_graph.firstInc(*this, direction, n);
482 480
      }
483 481

	
484 482
      IncEdgeIt(const Digraph& _graph, const Edge &ue, const Node &n)
485 483
	: digraph(&_graph), Edge(ue) {
486 484
	direction = (_graph.source(ue) == n);
487 485
      }
488 486

	
489 487
      IncEdgeIt& operator++() {
490 488
	digraph->nextInc(*this, direction);
491 489
	return *this; 
492 490
      }
493 491
    };
494 492

	
495
    /// \brief Base node of the iterator
496
    ///
497
    /// Returns the base node (ie. the source in this case) of the iterator
493
    // \brief Base node of the iterator
494
    //
495
    // Returns the base node (ie. the source in this case) of the iterator
498 496
    Node baseNode(const OutArcIt &e) const {
499 497
      return Parent::source(static_cast<const Arc&>(e));
500 498
    }
501
    /// \brief Running node of the iterator
502
    ///
503
    /// Returns the running node (ie. the target in this case) of the
504
    /// iterator
499
    // \brief Running node of the iterator
500
    //
501
    // Returns the running node (ie. the target in this case) of the
502
    // iterator
505 503
    Node runningNode(const OutArcIt &e) const {
506 504
      return Parent::target(static_cast<const Arc&>(e));
507 505
    }
508 506

	
509
    /// \brief Base node of the iterator
510
    ///
511
    /// Returns the base node (ie. the target in this case) of the iterator
507
    // \brief Base node of the iterator
508
    //
509
    // Returns the base node (ie. the target in this case) of the iterator
512 510
    Node baseNode(const InArcIt &e) const {
513 511
      return Parent::target(static_cast<const Arc&>(e));
514 512
    }
515
    /// \brief Running node of the iterator
516
    ///
517
    /// Returns the running node (ie. the source in this case) of the
518
    /// iterator
513
    // \brief Running node of the iterator
514
    //
515
    // Returns the running node (ie. the source in this case) of the
516
    // iterator
519 517
    Node runningNode(const InArcIt &e) const {
520 518
      return Parent::source(static_cast<const Arc&>(e));
521 519
    }
522 520

	
523
    /// Base node of the iterator
524
    ///
525
    /// Returns the base node of the iterator
521
    // Base node of the iterator
522
    //
523
    // Returns the base node of the iterator
526 524
    Node baseNode(const IncEdgeIt &e) const {
527 525
      return e.direction ? u(e) : v(e);
528 526
    }
529
    /// Running node of the iterator
530
    ///
531
    /// Returns the running node of the iterator
527
    // Running node of the iterator
528
    //
529
    // Returns the running node of the iterator
532 530
    Node runningNode(const IncEdgeIt &e) const {
533 531
      return e.direction ? v(e) : u(e);
534 532
    }
535 533

	
536 534

	
537 535
    template <typename _Value>
538 536
    class ArcMap 
539 537
      : public MapExtender<DefaultMap<Digraph, Arc, _Value> > {
540 538
    public:
541 539
      typedef EdgeSetExtender Digraph;
542 540
      typedef MapExtender<DefaultMap<Digraph, Arc, _Value> > Parent;
543 541

	
544 542
      ArcMap(const Digraph& _g) 
545 543
	: Parent(_g) {}
546 544
      ArcMap(const Digraph& _g, const _Value& _v) 
547 545
	: Parent(_g, _v) {}
548 546

	
549 547
      ArcMap& operator=(const ArcMap& cmap) {
550 548
	return operator=<ArcMap>(cmap);
551 549
      }
552 550

	
553 551
      template <typename CMap>
554 552
      ArcMap& operator=(const CMap& cmap) {
555 553
        Parent::operator=(cmap);
556 554
	return *this;
557 555
      }
558 556

	
559 557
    };
560 558

	
561 559

	
562 560
    template <typename _Value>
563 561
    class EdgeMap 
564 562
      : public MapExtender<DefaultMap<Digraph, Edge, _Value> > {
565 563
    public:
566 564
      typedef EdgeSetExtender Digraph;
567 565
      typedef MapExtender<DefaultMap<Digraph, Edge, _Value> > Parent;
568 566

	
569 567
      EdgeMap(const Digraph& _g) 
570 568
	: Parent(_g) {}
571 569

	
572 570
      EdgeMap(const Digraph& _g, const _Value& _v) 
573 571
	: Parent(_g, _v) {}
574 572

	
575 573
      EdgeMap& operator=(const EdgeMap& cmap) {
576 574
	return operator=<EdgeMap>(cmap);
577 575
      }
578 576

	
579 577
      template <typename CMap>
580 578
      EdgeMap& operator=(const CMap& cmap) {
581 579
        Parent::operator=(cmap);
582 580
	return *this;
583 581
      }
584 582

	
585 583
    };
586 584

	
587 585

	
588 586
    // Alteration extension
589 587

	
590 588
    Edge addEdge(const Node& from, const Node& to) {
591 589
      Edge edge = Parent::addEdge(from, to);
592 590
      notifier(Edge()).add(edge);
593 591
      std::vector<Arc> arcs;
594 592
      arcs.push_back(Parent::direct(edge, true));
595 593
      arcs.push_back(Parent::direct(edge, false));
596 594
      notifier(Arc()).add(arcs);
597 595
      return edge;
598 596
    }
599 597
    
600 598
    void clear() {
601 599
      notifier(Arc()).clear();
602 600
      notifier(Edge()).clear();
603 601
      Parent::clear();
604 602
    }
605 603

	
606 604
    void erase(const Edge& edge) {
607 605
      std::vector<Arc> arcs;
608 606
      arcs.push_back(Parent::direct(edge, true));
609 607
      arcs.push_back(Parent::direct(edge, false));
610 608
      notifier(Arc()).erase(arcs);
611 609
      notifier(Edge()).erase(edge);
612 610
      Parent::erase(edge);
613 611
    }
614 612

	
615 613

	
616 614
    EdgeSetExtender() {
617 615
      arc_notifier.setContainer(*this);
618 616
      edge_notifier.setContainer(*this);
619 617
    }
620 618

	
621 619
    ~EdgeSetExtender() {
622 620
      edge_notifier.clear();
623 621
      arc_notifier.clear();
624 622
    }
625 623
    
626 624
  };
627 625

	
628 626
}
629 627

	
630 628
#endif
Ignore white space 3072 line context
1 1
/* -*- mode: C++; indent-tabs-mode: nil; -*-
2 2
 *
3 3
 * This file is a part of LEMON, a generic C++ optimization library.
4 4
 *
5 5
 * Copyright (C) 2003-2009
6 6
 * Egervary Jeno Kombinatorikus Optimalizalasi Kutatocsoport
7 7
 * (Egervary Research Group on Combinatorial Optimization, EGRES).
8 8
 *
9 9
 * Permission to use, modify and distribute this software is granted
10 10
 * provided that this copyright notice appears in all copies. For
11 11
 * precise terms see the accompanying LICENSE file.
12 12
 *
13 13
 * This software is provided "AS IS" with no warranty of any kind,
14 14
 * express or implied, and with no claim as to its suitability for any
15 15
 * purpose.
16 16
 *
17 17
 */
18 18

	
19 19
#ifndef LEMON_CIRCULATION_H
20 20
#define LEMON_CIRCULATION_H
21 21

	
22 22
#include <lemon/tolerance.h>
23 23
#include <lemon/elevator.h>
24 24

	
25 25
///\ingroup max_flow
26 26
///\file
27 27
///\brief Push-relabel algorithm for finding a feasible circulation.
28 28
///
29 29
namespace lemon {
30 30

	
31 31
  /// \brief Default traits class of Circulation class.
32 32
  ///
33 33
  /// Default traits class of Circulation class.
34 34
  /// \tparam GR Digraph type.
35 35
  /// \tparam LM Lower bound capacity map type.
36 36
  /// \tparam UM Upper bound capacity map type.
37 37
  /// \tparam DM Delta map type.
38 38
  template <typename GR, typename LM,
39 39
            typename UM, typename DM>
40 40
  struct CirculationDefaultTraits {
41 41

	
42 42
    /// \brief The type of the digraph the algorithm runs on.
43 43
    typedef GR Digraph;
44 44

	
45 45
    /// \brief The type of the map that stores the circulation lower
46 46
    /// bound.
47 47
    ///
48 48
    /// The type of the map that stores the circulation lower bound.
49 49
    /// It must meet the \ref concepts::ReadMap "ReadMap" concept.
50 50
    typedef LM LCapMap;
51 51

	
52 52
    /// \brief The type of the map that stores the circulation upper
53 53
    /// bound.
54 54
    ///
55 55
    /// The type of the map that stores the circulation upper bound.
56 56
    /// It must meet the \ref concepts::ReadMap "ReadMap" concept.
57 57
    typedef UM UCapMap;
58 58

	
59 59
    /// \brief The type of the map that stores the lower bound for
60 60
    /// the supply of the nodes.
61 61
    ///
62 62
    /// The type of the map that stores the lower bound for the supply
63 63
    /// of the nodes. It must meet the \ref concepts::ReadMap "ReadMap"
64 64
    /// concept.
65 65
    typedef DM DeltaMap;
66 66

	
67 67
    /// \brief The type of the flow values.
68 68
    typedef typename DeltaMap::Value Value;
69 69

	
70 70
    /// \brief The type of the map that stores the flow values.
71 71
    ///
72 72
    /// The type of the map that stores the flow values.
73 73
    /// It must meet the \ref concepts::ReadWriteMap "ReadWriteMap" concept.
74 74
    typedef typename Digraph::template ArcMap<Value> FlowMap;
75 75

	
76 76
    /// \brief Instantiates a FlowMap.
77 77
    ///
78 78
    /// This function instantiates a \ref FlowMap.
79 79
    /// \param digraph The digraph, to which we would like to define
80 80
    /// the flow map.
81 81
    static FlowMap* createFlowMap(const Digraph& digraph) {
82 82
      return new FlowMap(digraph);
83 83
    }
84 84

	
85 85
    /// \brief The elevator type used by the algorithm.
86 86
    ///
87 87
    /// The elevator type used by the algorithm.
88 88
    ///
89 89
    /// \sa Elevator
90 90
    /// \sa LinkedElevator
91 91
    typedef lemon::Elevator<Digraph, typename Digraph::Node> Elevator;
92 92

	
93 93
    /// \brief Instantiates an Elevator.
94 94
    ///
95 95
    /// This function instantiates an \ref Elevator.
96 96
    /// \param digraph The digraph, to which we would like to define
97 97
    /// the elevator.
98 98
    /// \param max_level The maximum level of the elevator.
99 99
    static Elevator* createElevator(const Digraph& digraph, int max_level) {
100 100
      return new Elevator(digraph, max_level);
101 101
    }
102 102

	
103 103
    /// \brief The tolerance used by the algorithm
104 104
    ///
105 105
    /// The tolerance used by the algorithm to handle inexact computation.
106 106
    typedef lemon::Tolerance<Value> Tolerance;
107 107

	
108 108
  };
109 109

	
110 110
  /**
111 111
     \brief Push-relabel algorithm for the network circulation problem.
112 112

	
113 113
     \ingroup max_flow
114 114
     This class implements a push-relabel algorithm for the network
115 115
     circulation problem.
116 116
     It is to find a feasible circulation when lower and upper bounds
117 117
     are given for the flow values on the arcs and lower bounds
118 118
     are given for the supply values of the nodes.
119 119

	
120 120
     The exact formulation of this problem is the following.
121 121
     Let \f$G=(V,A)\f$ be a digraph,
122 122
     \f$lower, upper: A\rightarrow\mathbf{R}^+_0\f$,
123 123
     \f$delta: V\rightarrow\mathbf{R}\f$. Find a feasible circulation
124 124
     \f$f: A\rightarrow\mathbf{R}^+_0\f$ so that
125 125
     \f[ \sum_{a\in\delta_{out}(v)} f(a) - \sum_{a\in\delta_{in}(v)} f(a)
126 126
     \geq delta(v) \quad \forall v\in V, \f]
127 127
     \f[ lower(a)\leq f(a) \leq upper(a) \quad \forall a\in A. \f]
128 128
     \note \f$delta(v)\f$ specifies a lower bound for the supply of node
129 129
     \f$v\f$. It can be either positive or negative, however note that
130 130
     \f$\sum_{v\in V}delta(v)\f$ should be zero or negative in order to
131 131
     have a feasible solution.
132 132

	
133 133
     \note A special case of this problem is when
134 134
     \f$\sum_{v\in V}delta(v) = 0\f$. Then the supply of each node \f$v\f$
135 135
     will be \e equal \e to \f$delta(v)\f$, if a circulation can be found.
136 136
     Thus a feasible solution for the
137 137
     \ref min_cost_flow "minimum cost flow" problem can be calculated
138 138
     in this way.
139 139

	
140 140
     \tparam GR The type of the digraph the algorithm runs on.
141 141
     \tparam LM The type of the lower bound capacity map. The default
142 142
     map type is \ref concepts::Digraph::ArcMap "GR::ArcMap<int>".
143 143
     \tparam UM The type of the upper bound capacity map. The default
144 144
     map type is \c LM.
145 145
     \tparam DM The type of the map that stores the lower bound
146 146
     for the supply of the nodes. The default map type is
147 147
     \ref concepts::Digraph::NodeMap "GR::NodeMap<UM::Value>".
148 148
  */
149 149
#ifdef DOXYGEN
150 150
template< typename GR,
151 151
          typename LM,
152 152
          typename UM,
153 153
          typename DM,
154 154
          typename TR >
155 155
#else
156 156
template< typename GR,
157 157
          typename LM = typename GR::template ArcMap<int>,
158 158
          typename UM = LM,
159 159
          typename DM = typename GR::template NodeMap<typename UM::Value>,
160 160
          typename TR = CirculationDefaultTraits<GR, LM, UM, DM> >
161 161
#endif
162 162
  class Circulation {
163 163
  public:
164 164

	
165 165
    ///The \ref CirculationDefaultTraits "traits class" of the algorithm.
166 166
    typedef TR Traits;
167 167
    ///The type of the digraph the algorithm runs on.
168 168
    typedef typename Traits::Digraph Digraph;
169 169
    ///The type of the flow values.
170 170
    typedef typename Traits::Value Value;
171 171

	
172 172
    /// The type of the lower bound capacity map.
173 173
    typedef typename Traits::LCapMap LCapMap;
174 174
    /// The type of the upper bound capacity map.
175 175
    typedef typename Traits::UCapMap UCapMap;
176 176
    /// \brief The type of the map that stores the lower bound for
177 177
    /// the supply of the nodes.
178 178
    typedef typename Traits::DeltaMap DeltaMap;
179 179
    ///The type of the flow map.
180 180
    typedef typename Traits::FlowMap FlowMap;
181 181

	
182 182
    ///The type of the elevator.
183 183
    typedef typename Traits::Elevator Elevator;
184 184
    ///The type of the tolerance.
185 185
    typedef typename Traits::Tolerance Tolerance;
186 186

	
187 187
  private:
188 188

	
189 189
    TEMPLATE_DIGRAPH_TYPEDEFS(Digraph);
190 190

	
191 191
    const Digraph &_g;
192 192
    int _node_num;
193 193

	
194 194
    const LCapMap *_lo;
195 195
    const UCapMap *_up;
196 196
    const DeltaMap *_delta;
197 197

	
198 198
    FlowMap *_flow;
199 199
    bool _local_flow;
200 200

	
201 201
    Elevator* _level;
202 202
    bool _local_level;
203 203

	
204 204
    typedef typename Digraph::template NodeMap<Value> ExcessMap;
205 205
    ExcessMap* _excess;
206 206

	
207 207
    Tolerance _tol;
208 208
    int _el;
209 209

	
210 210
  public:
211 211

	
212 212
    typedef Circulation Create;
213 213

	
214 214
    ///\name Named Template Parameters
215 215

	
216 216
    ///@{
217 217

	
218
    template <typename _FlowMap>
218
    template <typename T>
219 219
    struct SetFlowMapTraits : public Traits {
220
      typedef _FlowMap FlowMap;
220
      typedef T FlowMap;
221 221
      static FlowMap *createFlowMap(const Digraph&) {
222 222
        LEMON_ASSERT(false, "FlowMap is not initialized");
223 223
        return 0; // ignore warnings
224 224
      }
225 225
    };
226 226

	
227 227
    /// \brief \ref named-templ-param "Named parameter" for setting
228 228
    /// FlowMap type
229 229
    ///
230 230
    /// \ref named-templ-param "Named parameter" for setting FlowMap
231 231
    /// type.
232
    template <typename _FlowMap>
232
    template <typename T>
233 233
    struct SetFlowMap
234 234
      : public Circulation<Digraph, LCapMap, UCapMap, DeltaMap,
235
                           SetFlowMapTraits<_FlowMap> > {
235
                           SetFlowMapTraits<T> > {
236 236
      typedef Circulation<Digraph, LCapMap, UCapMap, DeltaMap,
237
                          SetFlowMapTraits<_FlowMap> > Create;
237
                          SetFlowMapTraits<T> > Create;
238 238
    };
239 239

	
240
    template <typename _Elevator>
240
    template <typename T>
241 241
    struct SetElevatorTraits : public Traits {
242
      typedef _Elevator Elevator;
242
      typedef T Elevator;
243 243
      static Elevator *createElevator(const Digraph&, int) {
244 244
        LEMON_ASSERT(false, "Elevator is not initialized");
245 245
        return 0; // ignore warnings
246 246
      }
247 247
    };
248 248

	
249 249
    /// \brief \ref named-templ-param "Named parameter" for setting
250 250
    /// Elevator type
251 251
    ///
252 252
    /// \ref named-templ-param "Named parameter" for setting Elevator
253 253
    /// type. If this named parameter is used, then an external
254 254
    /// elevator object must be passed to the algorithm using the
255 255
    /// \ref elevator(Elevator&) "elevator()" function before calling
256 256
    /// \ref run() or \ref init().
257 257
    /// \sa SetStandardElevator
258
    template <typename _Elevator>
258
    template <typename T>
259 259
    struct SetElevator
260 260
      : public Circulation<Digraph, LCapMap, UCapMap, DeltaMap,
261
                           SetElevatorTraits<_Elevator> > {
261
                           SetElevatorTraits<T> > {
262 262
      typedef Circulation<Digraph, LCapMap, UCapMap, DeltaMap,
263
                          SetElevatorTraits<_Elevator> > Create;
263
                          SetElevatorTraits<T> > Create;
264 264
    };
265 265

	
266
    template <typename _Elevator>
266
    template <typename T>
267 267
    struct SetStandardElevatorTraits : public Traits {
268
      typedef _Elevator Elevator;
268
      typedef T Elevator;
269 269
      static Elevator *createElevator(const Digraph& digraph, int max_level) {
270 270
        return new Elevator(digraph, max_level);
271 271
      }
272 272
    };
273 273

	
274 274
    /// \brief \ref named-templ-param "Named parameter" for setting
275 275
    /// Elevator type with automatic allocation
276 276
    ///
277 277
    /// \ref named-templ-param "Named parameter" for setting Elevator
278 278
    /// type with automatic allocation.
279 279
    /// The Elevator should have standard constructor interface to be
280 280
    /// able to automatically created by the algorithm (i.e. the
281 281
    /// digraph and the maximum level should be passed to it).
282 282
    /// However an external elevator object could also be passed to the
283 283
    /// algorithm with the \ref elevator(Elevator&) "elevator()" function
284 284
    /// before calling \ref run() or \ref init().
285 285
    /// \sa SetElevator
286
    template <typename _Elevator>
286
    template <typename T>
287 287
    struct SetStandardElevator
288 288
      : public Circulation<Digraph, LCapMap, UCapMap, DeltaMap,
289
                       SetStandardElevatorTraits<_Elevator> > {
289
                       SetStandardElevatorTraits<T> > {
290 290
      typedef Circulation<Digraph, LCapMap, UCapMap, DeltaMap,
291
                      SetStandardElevatorTraits<_Elevator> > Create;
291
                      SetStandardElevatorTraits<T> > Create;
292 292
    };
293 293

	
294 294
    /// @}
295 295

	
296 296
  protected:
297 297

	
298 298
    Circulation() {}
299 299

	
300 300
  public:
301 301

	
302 302
    /// The constructor of the class.
303 303

	
304 304
    /// The constructor of the class.
305 305
    /// \param g The digraph the algorithm runs on.
306 306
    /// \param lo The lower bound capacity of the arcs.
307 307
    /// \param up The upper bound capacity of the arcs.
308 308
    /// \param delta The lower bound for the supply of the nodes.
309 309
    Circulation(const Digraph &g,const LCapMap &lo,
310 310
                const UCapMap &up,const DeltaMap &delta)
311 311
      : _g(g), _node_num(),
312 312
        _lo(&lo),_up(&up),_delta(&delta),_flow(0),_local_flow(false),
313 313
        _level(0), _local_level(false), _excess(0), _el() {}
314 314

	
315 315
    /// Destructor.
316 316
    ~Circulation() {
317 317
      destroyStructures();
318 318
    }
319 319

	
320 320

	
321 321
  private:
322 322

	
323 323
    void createStructures() {
324 324
      _node_num = _el = countNodes(_g);
325 325

	
326 326
      if (!_flow) {
327 327
        _flow = Traits::createFlowMap(_g);
328 328
        _local_flow = true;
329 329
      }
330 330
      if (!_level) {
331 331
        _level = Traits::createElevator(_g, _node_num);
332 332
        _local_level = true;
333 333
      }
334 334
      if (!_excess) {
335 335
        _excess = new ExcessMap(_g);
336 336
      }
337 337
    }
338 338

	
339 339
    void destroyStructures() {
340 340
      if (_local_flow) {
341 341
        delete _flow;
342 342
      }
343 343
      if (_local_level) {
344 344
        delete _level;
345 345
      }
346 346
      if (_excess) {
347 347
        delete _excess;
348 348
      }
349 349
    }
350 350

	
351 351
  public:
352 352

	
353 353
    /// Sets the lower bound capacity map.
354 354

	
355 355
    /// Sets the lower bound capacity map.
356 356
    /// \return <tt>(*this)</tt>
357 357
    Circulation& lowerCapMap(const LCapMap& map) {
358 358
      _lo = &map;
359 359
      return *this;
360 360
    }
361 361

	
362 362
    /// Sets the upper bound capacity map.
363 363

	
364 364
    /// Sets the upper bound capacity map.
365 365
    /// \return <tt>(*this)</tt>
366 366
    Circulation& upperCapMap(const LCapMap& map) {
367 367
      _up = &map;
368 368
      return *this;
369 369
    }
370 370

	
371 371
    /// Sets the lower bound map for the supply of the nodes.
372 372

	
373 373
    /// Sets the lower bound map for the supply of the nodes.
374 374
    /// \return <tt>(*this)</tt>
375 375
    Circulation& deltaMap(const DeltaMap& map) {
376 376
      _delta = &map;
377 377
      return *this;
378 378
    }
379 379

	
380 380
    /// \brief Sets the flow map.
381 381
    ///
382 382
    /// Sets the flow map.
383 383
    /// If you don't use this function before calling \ref run() or
384 384
    /// \ref init(), an instance will be allocated automatically.
385 385
    /// The destructor deallocates this automatically allocated map,
386 386
    /// of course.
387 387
    /// \return <tt>(*this)</tt>
388 388
    Circulation& flowMap(FlowMap& map) {
389 389
      if (_local_flow) {
390 390
        delete _flow;
391 391
        _local_flow = false;
392 392
      }
393 393
      _flow = &map;
394 394
      return *this;
395 395
    }
396 396

	
397 397
    /// \brief Sets the elevator used by algorithm.
398 398
    ///
399 399
    /// Sets the elevator used by algorithm.
400 400
    /// If you don't use this function before calling \ref run() or
401 401
    /// \ref init(), an instance will be allocated automatically.
402 402
    /// The destructor deallocates this automatically allocated elevator,
403 403
    /// of course.
404 404
    /// \return <tt>(*this)</tt>
405 405
    Circulation& elevator(Elevator& elevator) {
406 406
      if (_local_level) {
407 407
        delete _level;
408 408
        _local_level = false;
409 409
      }
410 410
      _level = &elevator;
411 411
      return *this;
412 412
    }
413 413

	
414 414
    /// \brief Returns a const reference to the elevator.
415 415
    ///
416 416
    /// Returns a const reference to the elevator.
417 417
    ///
418 418
    /// \pre Either \ref run() or \ref init() must be called before
419 419
    /// using this function.
420 420
    const Elevator& elevator() const {
421 421
      return *_level;
422 422
    }
423 423

	
424 424
    /// \brief Sets the tolerance used by algorithm.
425 425
    ///
426 426
    /// Sets the tolerance used by algorithm.
427 427
    Circulation& tolerance(const Tolerance& tolerance) const {
428 428
      _tol = tolerance;
429 429
      return *this;
430 430
    }
431 431

	
432 432
    /// \brief Returns a const reference to the tolerance.
433 433
    ///
434 434
    /// Returns a const reference to the tolerance.
435 435
    const Tolerance& tolerance() const {
436 436
      return tolerance;
437 437
    }
438 438

	
439 439
    /// \name Execution Control
440 440
    /// The simplest way to execute the algorithm is to call \ref run().\n
441 441
    /// If you need more control on the initial solution or the execution,
442 442
    /// first you have to call one of the \ref init() functions, then
443 443
    /// the \ref start() function.
444 444

	
445 445
    ///@{
446 446

	
447 447
    /// Initializes the internal data structures.
448 448

	
449 449
    /// Initializes the internal data structures and sets all flow values
450 450
    /// to the lower bound.
451 451
    void init()
452 452
    {
453 453
      createStructures();
454 454

	
455 455
      for(NodeIt n(_g);n!=INVALID;++n) {
456 456
        _excess->set(n, (*_delta)[n]);
457 457
      }
458 458

	
459 459
      for (ArcIt e(_g);e!=INVALID;++e) {
460 460
        _flow->set(e, (*_lo)[e]);
461 461
        _excess->set(_g.target(e), (*_excess)[_g.target(e)] + (*_flow)[e]);
462 462
        _excess->set(_g.source(e), (*_excess)[_g.source(e)] - (*_flow)[e]);
463 463
      }
464 464

	
465 465
      // global relabeling tested, but in general case it provides
466 466
      // worse performance for random digraphs
467 467
      _level->initStart();
468 468
      for(NodeIt n(_g);n!=INVALID;++n)
469 469
        _level->initAddItem(n);
470 470
      _level->initFinish();
471 471
      for(NodeIt n(_g);n!=INVALID;++n)
472 472
        if(_tol.positive((*_excess)[n]))
473 473
          _level->activate(n);
474 474
    }
475 475

	
476 476
    /// Initializes the internal data structures using a greedy approach.
477 477

	
478 478
    /// Initializes the internal data structures using a greedy approach
479 479
    /// to construct the initial solution.
480 480
    void greedyInit()
481 481
    {
482 482
      createStructures();
483 483

	
484 484
      for(NodeIt n(_g);n!=INVALID;++n) {
485 485
        _excess->set(n, (*_delta)[n]);
486 486
      }
487 487

	
488 488
      for (ArcIt e(_g);e!=INVALID;++e) {
489 489
        if (!_tol.positive((*_excess)[_g.target(e)] + (*_up)[e])) {
490 490
          _flow->set(e, (*_up)[e]);
491 491
          _excess->set(_g.target(e), (*_excess)[_g.target(e)] + (*_up)[e]);
492 492
          _excess->set(_g.source(e), (*_excess)[_g.source(e)] - (*_up)[e]);
493 493
        } else if (_tol.positive((*_excess)[_g.target(e)] + (*_lo)[e])) {
494 494
          _flow->set(e, (*_lo)[e]);
495 495
          _excess->set(_g.target(e), (*_excess)[_g.target(e)] + (*_lo)[e]);
496 496
          _excess->set(_g.source(e), (*_excess)[_g.source(e)] - (*_lo)[e]);
497 497
        } else {
498 498
          Value fc = -(*_excess)[_g.target(e)];
499 499
          _flow->set(e, fc);
500 500
          _excess->set(_g.target(e), 0);
501 501
          _excess->set(_g.source(e), (*_excess)[_g.source(e)] - fc);
502 502
        }
503 503
      }
504 504

	
505 505
      _level->initStart();
506 506
      for(NodeIt n(_g);n!=INVALID;++n)
507 507
        _level->initAddItem(n);
508 508
      _level->initFinish();
509 509
      for(NodeIt n(_g);n!=INVALID;++n)
510 510
        if(_tol.positive((*_excess)[n]))
511 511
          _level->activate(n);
512 512
    }
513 513

	
514 514
    ///Executes the algorithm
515 515

	
516 516
    ///This function executes the algorithm.
517 517
    ///
518 518
    ///\return \c true if a feasible circulation is found.
519 519
    ///
520 520
    ///\sa barrier()
521 521
    ///\sa barrierMap()
522 522
    bool start()
523 523
    {
524 524

	
525 525
      Node act;
526 526
      Node bact=INVALID;
527 527
      Node last_activated=INVALID;
528 528
      while((act=_level->highestActive())!=INVALID) {
529 529
        int actlevel=(*_level)[act];
530 530
        int mlevel=_node_num;
531 531
        Value exc=(*_excess)[act];
532 532

	
533 533
        for(OutArcIt e(_g,act);e!=INVALID; ++e) {
534 534
          Node v = _g.target(e);
535 535
          Value fc=(*_up)[e]-(*_flow)[e];
536 536
          if(!_tol.positive(fc)) continue;
537 537
          if((*_level)[v]<actlevel) {
538 538
            if(!_tol.less(fc, exc)) {
539 539
              _flow->set(e, (*_flow)[e] + exc);
540 540
              _excess->set(v, (*_excess)[v] + exc);
541 541
              if(!_level->active(v) && _tol.positive((*_excess)[v]))
542 542
                _level->activate(v);
543 543
              _excess->set(act,0);
544 544
              _level->deactivate(act);
545 545
              goto next_l;
546 546
            }
547 547
            else {
548 548
              _flow->set(e, (*_up)[e]);
549 549
              _excess->set(v, (*_excess)[v] + fc);
550 550
              if(!_level->active(v) && _tol.positive((*_excess)[v]))
551 551
                _level->activate(v);
552 552
              exc-=fc;
553 553
            }
554 554
          }
555 555
          else if((*_level)[v]<mlevel) mlevel=(*_level)[v];
556 556
        }
557 557
        for(InArcIt e(_g,act);e!=INVALID; ++e) {
558 558
          Node v = _g.source(e);
559 559
          Value fc=(*_flow)[e]-(*_lo)[e];
560 560
          if(!_tol.positive(fc)) continue;
561 561
          if((*_level)[v]<actlevel) {
562 562
            if(!_tol.less(fc, exc)) {
563 563
              _flow->set(e, (*_flow)[e] - exc);
564 564
              _excess->set(v, (*_excess)[v] + exc);
565 565
              if(!_level->active(v) && _tol.positive((*_excess)[v]))
566 566
                _level->activate(v);
567 567
              _excess->set(act,0);
568 568
              _level->deactivate(act);
569 569
              goto next_l;
570 570
            }
571 571
            else {
572 572
              _flow->set(e, (*_lo)[e]);
573 573
              _excess->set(v, (*_excess)[v] + fc);
574 574
              if(!_level->active(v) && _tol.positive((*_excess)[v]))
575 575
                _level->activate(v);
576 576
              exc-=fc;
577 577
            }
578 578
          }
579 579
          else if((*_level)[v]<mlevel) mlevel=(*_level)[v];
580 580
        }
581 581

	
582 582
        _excess->set(act, exc);
583 583
        if(!_tol.positive(exc)) _level->deactivate(act);
584 584
        else if(mlevel==_node_num) {
585 585
          _level->liftHighestActiveToTop();
586 586
          _el = _node_num;
587 587
          return false;
588 588
        }
589 589
        else {
590 590
          _level->liftHighestActive(mlevel+1);
591 591
          if(_level->onLevel(actlevel)==0) {
592 592
            _el = actlevel;
593 593
            return false;
594 594
          }
595 595
        }
596 596
      next_l:
597 597
        ;
598 598
      }
599 599
      return true;
600 600
    }
601 601

	
602 602
    /// Runs the algorithm.
603 603

	
604 604
    /// This function runs the algorithm.
605 605
    ///
606 606
    /// \return \c true if a feasible circulation is found.
607 607
    ///
608 608
    /// \note Apart from the return value, c.run() is just a shortcut of
609 609
    /// the following code.
610 610
    /// \code
611 611
    ///   c.greedyInit();
612 612
    ///   c.start();
613 613
    /// \endcode
614 614
    bool run() {
615 615
      greedyInit();
616 616
      return start();
617 617
    }
618 618

	
619 619
    /// @}
620 620

	
621 621
    /// \name Query Functions
622 622
    /// The results of the circulation algorithm can be obtained using
623 623
    /// these functions.\n
624 624
    /// Either \ref run() or \ref start() should be called before
625 625
    /// using them.
626 626

	
627 627
    ///@{
628 628

	
629 629
    /// \brief Returns the flow on the given arc.
630 630
    ///
631 631
    /// Returns the flow on the given arc.
632 632
    ///
633 633
    /// \pre Either \ref run() or \ref init() must be called before
634 634
    /// using this function.
635 635
    Value flow(const Arc& arc) const {
636 636
      return (*_flow)[arc];
637 637
    }
638 638

	
639 639
    /// \brief Returns a const reference to the flow map.
640 640
    ///
641 641
    /// Returns a const reference to the arc map storing the found flow.
642 642
    ///
643 643
    /// \pre Either \ref run() or \ref init() must be called before
644 644
    /// using this function.
645 645
    const FlowMap& flowMap() const {
646 646
      return *_flow;
647 647
    }
648 648

	
649 649
    /**
650 650
       \brief Returns \c true if the given node is in a barrier.
651 651

	
652 652
       Barrier is a set \e B of nodes for which
653 653

	
654 654
       \f[ \sum_{a\in\delta_{out}(B)} upper(a) -
655 655
           \sum_{a\in\delta_{in}(B)} lower(a) < \sum_{v\in B}delta(v) \f]
656 656

	
657 657
       holds. The existence of a set with this property prooves that a
658 658
       feasible circualtion cannot exist.
659 659

	
660 660
       This function returns \c true if the given node is in the found
661 661
       barrier. If a feasible circulation is found, the function
662 662
       gives back \c false for every node.
663 663

	
664 664
       \pre Either \ref run() or \ref init() must be called before
665 665
       using this function.
666 666

	
667 667
       \sa barrierMap()
668 668
       \sa checkBarrier()
669 669
    */
670 670
    bool barrier(const Node& node) const
671 671
    {
672 672
      return (*_level)[node] >= _el;
673 673
    }
674 674

	
675 675
    /// \brief Gives back a barrier.
676 676
    ///
677 677
    /// This function sets \c bar to the characteristic vector of the
678 678
    /// found barrier. \c bar should be a \ref concepts::WriteMap "writable"
679 679
    /// node map with \c bool (or convertible) value type.
680 680
    ///
681 681
    /// If a feasible circulation is found, the function gives back an
682 682
    /// empty set, so \c bar[v] will be \c false for all nodes \c v.
683 683
    ///
684 684
    /// \note This function calls \ref barrier() for each node,
685
    /// so it runs in \f$O(n)\f$ time.
685
    /// so it runs in O(n) time.
686 686
    ///
687 687
    /// \pre Either \ref run() or \ref init() must be called before
688 688
    /// using this function.
689 689
    ///
690 690
    /// \sa barrier()
691 691
    /// \sa checkBarrier()
692 692
    template<class BarrierMap>
693 693
    void barrierMap(BarrierMap &bar) const
694 694
    {
695 695
      for(NodeIt n(_g);n!=INVALID;++n)
696 696
        bar.set(n, (*_level)[n] >= _el);
697 697
    }
698 698

	
699 699
    /// @}
700 700

	
701 701
    /// \name Checker Functions
702 702
    /// The feasibility of the results can be checked using
703 703
    /// these functions.\n
704 704
    /// Either \ref run() or \ref start() should be called before
705 705
    /// using them.
706 706

	
707 707
    ///@{
708 708

	
709 709
    ///Check if the found flow is a feasible circulation
710 710

	
711 711
    ///Check if the found flow is a feasible circulation,
712 712
    ///
713 713
    bool checkFlow() const {
714 714
      for(ArcIt e(_g);e!=INVALID;++e)
715 715
        if((*_flow)[e]<(*_lo)[e]||(*_flow)[e]>(*_up)[e]) return false;
716 716
      for(NodeIt n(_g);n!=INVALID;++n)
717 717
        {
718 718
          Value dif=-(*_delta)[n];
719 719
          for(InArcIt e(_g,n);e!=INVALID;++e) dif-=(*_flow)[e];
720 720
          for(OutArcIt e(_g,n);e!=INVALID;++e) dif+=(*_flow)[e];
721 721
          if(_tol.negative(dif)) return false;
722 722
        }
723 723
      return true;
724 724
    }
725 725

	
726 726
    ///Check whether or not the last execution provides a barrier
727 727

	
728 728
    ///Check whether or not the last execution provides a barrier.
729 729
    ///\sa barrier()
730 730
    ///\sa barrierMap()
731 731
    bool checkBarrier() const
732 732
    {
733 733
      Value delta=0;
734 734
      for(NodeIt n(_g);n!=INVALID;++n)
735 735
        if(barrier(n))
736 736
          delta-=(*_delta)[n];
737 737
      for(ArcIt e(_g);e!=INVALID;++e)
738 738
        {
739 739
          Node s=_g.source(e);
740 740
          Node t=_g.target(e);
741 741
          if(barrier(s)&&!barrier(t)) delta+=(*_up)[e];
742 742
          else if(barrier(t)&&!barrier(s)) delta-=(*_lo)[e];
743 743
        }
744 744
      return _tol.negative(delta);
745 745
    }
746 746

	
747 747
    /// @}
748 748

	
749 749
  };
750 750

	
751 751
}
752 752

	
753 753
#endif
Ignore white space 3072 line context
1 1
/* -*- mode: C++; indent-tabs-mode: nil; -*-
2 2
 *
3 3
 * This file is a part of LEMON, a generic C++ optimization library.
4 4
 *
5 5
 * Copyright (C) 2003-2009
6 6
 * Egervary Jeno Kombinatorikus Optimalizalasi Kutatocsoport
7 7
 * (Egervary Research Group on Combinatorial Optimization, EGRES).
8 8
 *
9 9
 * Permission to use, modify and distribute this software is granted
10 10
 * provided that this copyright notice appears in all copies. For
11 11
 * precise terms see the accompanying LICENSE file.
12 12
 *
13 13
 * This software is provided "AS IS" with no warranty of any kind,
14 14
 * express or implied, and with no claim as to its suitability for any
15 15
 * purpose.
16 16
 *
17 17
 */
18 18

	
19 19
///\ingroup graph_concepts
20 20
///\file
21 21
///\brief The concept of Undirected Graphs.
22 22

	
23 23
#ifndef LEMON_CONCEPTS_GRAPH_H
24 24
#define LEMON_CONCEPTS_GRAPH_H
25 25

	
26 26
#include <lemon/concepts/graph_components.h>
27 27
#include <lemon/core.h>
28 28

	
29 29
namespace lemon {
30 30
  namespace concepts {
31 31

	
32 32
    /// \ingroup graph_concepts
33 33
    ///
34 34
    /// \brief Class describing the concept of Undirected Graphs.
35 35
    ///
36 36
    /// This class describes the common interface of all Undirected
37 37
    /// Graphs.
38 38
    ///
39 39
    /// As all concept describing classes it provides only interface
40 40
    /// without any sensible implementation. So any algorithm for
41 41
    /// undirected graph should compile with this class, but it will not
42 42
    /// run properly, of course.
43 43
    ///
44 44
    /// The LEMON undirected graphs also fulfill the concept of
45 45
    /// directed graphs (\ref lemon::concepts::Digraph "Digraph
46 46
    /// Concept"). Each edges can be seen as two opposite
47 47
    /// directed arc and consequently the undirected graph can be
48 48
    /// seen as the direceted graph of these directed arcs. The
49 49
    /// Graph has the Edge inner class for the edges and
50 50
    /// the Arc type for the directed arcs. The Arc type is
51 51
    /// convertible to Edge or inherited from it so from a directed
52 52
    /// arc we can get the represented edge.
53 53
    ///
54 54
    /// In the sense of the LEMON each edge has a default
55 55
    /// direction (it should be in every computer implementation,
56 56
    /// because the order of edge's nodes defines an
57 57
    /// orientation). With the default orientation we can define that
58 58
    /// the directed arc is forward or backward directed. With the \c
59 59
    /// direction() and \c direct() function we can get the direction
60 60
    /// of the directed arc and we can direct an edge.
61 61
    ///
62 62
    /// The EdgeIt is an iterator for the edges. We can use
63 63
    /// the EdgeMap to map values for the edges. The InArcIt and
64 64
    /// OutArcIt iterates on the same edges but with opposite
65 65
    /// direction. The IncEdgeIt iterates also on the same edges
66 66
    /// as the OutArcIt and InArcIt but it is not convertible to Arc just
67 67
    /// to Edge.
68 68
    class Graph {
69 69
    public:
70 70
      /// \brief The undirected graph should be tagged by the
71 71
      /// UndirectedTag.
72 72
      ///
73 73
      /// The undirected graph should be tagged by the UndirectedTag. This
74 74
      /// tag helps the enable_if technics to make compile time
75 75
      /// specializations for undirected graphs.
76 76
      typedef True UndirectedTag;
77 77

	
78 78
      /// \brief The base type of node iterators,
79 79
      /// or in other words, the trivial node iterator.
80 80
      ///
81 81
      /// This is the base type of each node iterator,
82 82
      /// thus each kind of node iterator converts to this.
83 83
      /// More precisely each kind of node iterator should be inherited
84 84
      /// from the trivial node iterator.
85 85
      class Node {
86 86
      public:
87 87
        /// Default constructor
88 88

	
89 89
        /// @warning The default constructor sets the iterator
90 90
        /// to an undefined value.
91 91
        Node() { }
92 92
        /// Copy constructor.
93 93

	
94 94
        /// Copy constructor.
95 95
        ///
96 96
        Node(const Node&) { }
97 97

	
98 98
        /// Invalid constructor \& conversion.
99 99

	
100 100
        /// This constructor initializes the iterator to be invalid.
101 101
        /// \sa Invalid for more details.
102 102
        Node(Invalid) { }
103 103
        /// Equality operator
104 104

	
105 105
        /// Two iterators are equal if and only if they point to the
106 106
        /// same object or both are invalid.
107 107
        bool operator==(Node) const { return true; }
108 108

	
109 109
        /// Inequality operator
110 110

	
111 111
        /// \sa operator==(Node n)
112 112
        ///
113 113
        bool operator!=(Node) const { return true; }
114 114

	
115 115
        /// Artificial ordering operator.
116 116

	
117 117
        /// To allow the use of graph descriptors as key type in std::map or
118 118
        /// similar associative container we require this.
119 119
        ///
120 120
        /// \note This operator only have to define some strict ordering of
121 121
        /// the items; this order has nothing to do with the iteration
122 122
        /// ordering of the items.
123 123
        bool operator<(Node) const { return false; }
124 124

	
125 125
      };
126 126

	
127 127
      /// This iterator goes through each node.
128 128

	
129 129
      /// This iterator goes through each node.
130 130
      /// Its usage is quite simple, for example you can count the number
131 131
      /// of nodes in graph \c g of type \c Graph like this:
132 132
      ///\code
133 133
      /// int count=0;
134 134
      /// for (Graph::NodeIt n(g); n!=INVALID; ++n) ++count;
135 135
      ///\endcode
136 136
      class NodeIt : public Node {
137 137
      public:
138 138
        /// Default constructor
139 139

	
140 140
        /// @warning The default constructor sets the iterator
141 141
        /// to an undefined value.
142 142
        NodeIt() { }
143 143
        /// Copy constructor.
144 144

	
145 145
        /// Copy constructor.
146 146
        ///
147 147
        NodeIt(const NodeIt& n) : Node(n) { }
148 148
        /// Invalid constructor \& conversion.
149 149

	
150 150
        /// Initialize the iterator to be invalid.
151 151
        /// \sa Invalid for more details.
152 152
        NodeIt(Invalid) { }
153 153
        /// Sets the iterator to the first node.
154 154

	
155 155
        /// Sets the iterator to the first node of \c g.
156 156
        ///
157 157
        NodeIt(const Graph&) { }
158 158
        /// Node -> NodeIt conversion.
159 159

	
160 160
        /// Sets the iterator to the node of \c the graph pointed by
161 161
        /// the trivial iterator.
162 162
        /// This feature necessitates that each time we
163 163
        /// iterate the arc-set, the iteration order is the same.
164 164
        NodeIt(const Graph&, const Node&) { }
165 165
        /// Next node.
166 166

	
167 167
        /// Assign the iterator to the next node.
168 168
        ///
169 169
        NodeIt& operator++() { return *this; }
170 170
      };
171 171

	
172 172

	
173 173
      /// The base type of the edge iterators.
174 174

	
175 175
      /// The base type of the edge iterators.
176 176
      ///
177 177
      class Edge {
178 178
      public:
179 179
        /// Default constructor
180 180

	
181 181
        /// @warning The default constructor sets the iterator
182 182
        /// to an undefined value.
183 183
        Edge() { }
184 184
        /// Copy constructor.
185 185

	
186 186
        /// Copy constructor.
187 187
        ///
188 188
        Edge(const Edge&) { }
189 189
        /// Initialize the iterator to be invalid.
190 190

	
191 191
        /// Initialize the iterator to be invalid.
192 192
        ///
193 193
        Edge(Invalid) { }
194 194
        /// Equality operator
195 195

	
196 196
        /// Two iterators are equal if and only if they point to the
197 197
        /// same object or both are invalid.
198 198
        bool operator==(Edge) const { return true; }
199 199
        /// Inequality operator
200 200

	
201 201
        /// \sa operator==(Edge n)
202 202
        ///
203 203
        bool operator!=(Edge) const { return true; }
204 204

	
205 205
        /// Artificial ordering operator.
206 206

	
207 207
        /// To allow the use of graph descriptors as key type in std::map or
208 208
        /// similar associative container we require this.
209 209
        ///
210 210
        /// \note This operator only have to define some strict ordering of
211 211
        /// the items; this order has nothing to do with the iteration
212 212
        /// ordering of the items.
213 213
        bool operator<(Edge) const { return false; }
214 214
      };
215 215

	
216 216
      /// This iterator goes through each edge.
217 217

	
218 218
      /// This iterator goes through each edge of a graph.
219 219
      /// Its usage is quite simple, for example you can count the number
220 220
      /// of edges in a graph \c g of type \c Graph as follows:
221 221
      ///\code
222 222
      /// int count=0;
223 223
      /// for(Graph::EdgeIt e(g); e!=INVALID; ++e) ++count;
224 224
      ///\endcode
225 225
      class EdgeIt : public Edge {
226 226
      public:
227 227
        /// Default constructor
228 228

	
229 229
        /// @warning The default constructor sets the iterator
230 230
        /// to an undefined value.
231 231
        EdgeIt() { }
232 232
        /// Copy constructor.
233 233

	
234 234
        /// Copy constructor.
235 235
        ///
236 236
        EdgeIt(const EdgeIt& e) : Edge(e) { }
237 237
        /// Initialize the iterator to be invalid.
238 238

	
239 239
        /// Initialize the iterator to be invalid.
240 240
        ///
241 241
        EdgeIt(Invalid) { }
242 242
        /// This constructor sets the iterator to the first edge.
243 243

	
244 244
        /// This constructor sets the iterator to the first edge.
245 245
        EdgeIt(const Graph&) { }
246 246
        /// Edge -> EdgeIt conversion
247 247

	
248 248
        /// Sets the iterator to the value of the trivial iterator.
249 249
        /// This feature necessitates that each time we
250 250
        /// iterate the edge-set, the iteration order is the
251 251
        /// same.
252 252
        EdgeIt(const Graph&, const Edge&) { }
253 253
        /// Next edge
254 254

	
255 255
        /// Assign the iterator to the next edge.
256 256
        EdgeIt& operator++() { return *this; }
257 257
      };
258 258

	
259 259
      /// \brief This iterator goes trough the incident undirected
260 260
      /// arcs of a node.
261 261
      ///
262 262
      /// This iterator goes trough the incident edges
263 263
      /// of a certain node of a graph. You should assume that the
264 264
      /// loop arcs will be iterated twice.
265 265
      ///
266 266
      /// Its usage is quite simple, for example you can compute the
267 267
      /// degree (i.e. count the number of incident arcs of a node \c n
268 268
      /// in graph \c g of type \c Graph as follows.
269 269
      ///
270 270
      ///\code
271 271
      /// int count=0;
272 272
      /// for(Graph::IncEdgeIt e(g, n); e!=INVALID; ++e) ++count;
273 273
      ///\endcode
274 274
      class IncEdgeIt : public Edge {
275 275
      public:
276 276
        /// Default constructor
277 277

	
278 278
        /// @warning The default constructor sets the iterator
279 279
        /// to an undefined value.
280 280
        IncEdgeIt() { }
281 281
        /// Copy constructor.
282 282

	
283 283
        /// Copy constructor.
284 284
        ///
285 285
        IncEdgeIt(const IncEdgeIt& e) : Edge(e) { }
286 286
        /// Initialize the iterator to be invalid.
287 287

	
288 288
        /// Initialize the iterator to be invalid.
289 289
        ///
290 290
        IncEdgeIt(Invalid) { }
291 291
        /// This constructor sets the iterator to first incident arc.
292 292

	
293 293
        /// This constructor set the iterator to the first incident arc of
294 294
        /// the node.
295 295
        IncEdgeIt(const Graph&, const Node&) { }
296 296
        /// Edge -> IncEdgeIt conversion
297 297

	
298 298
        /// Sets the iterator to the value of the trivial iterator \c e.
299 299
        /// This feature necessitates that each time we
300 300
        /// iterate the arc-set, the iteration order is the same.
301 301
        IncEdgeIt(const Graph&, const Edge&) { }
302 302
        /// Next incident arc
303 303

	
304 304
        /// Assign the iterator to the next incident arc
305 305
        /// of the corresponding node.
306 306
        IncEdgeIt& operator++() { return *this; }
307 307
      };
308 308

	
309 309
      /// The directed arc type.
310 310

	
311 311
      /// The directed arc type. It can be converted to the
312 312
      /// edge or it should be inherited from the undirected
313 313
      /// arc.
314 314
      class Arc : public Edge {
315 315
      public:
316 316
        /// Default constructor
317 317

	
318 318
        /// @warning The default constructor sets the iterator
319 319
        /// to an undefined value.
320 320
        Arc() { }
321 321
        /// Copy constructor.
322 322

	
323 323
        /// Copy constructor.
324 324
        ///
325 325
        Arc(const Arc& e) : Edge(e) { }
326 326
        /// Initialize the iterator to be invalid.
327 327

	
328 328
        /// Initialize the iterator to be invalid.
329 329
        ///
330 330
        Arc(Invalid) { }
331 331
        /// Equality operator
332 332

	
333 333
        /// Two iterators are equal if and only if they point to the
334 334
        /// same object or both are invalid.
335 335
        bool operator==(Arc) const { return true; }
336 336
        /// Inequality operator
337 337

	
338 338
        /// \sa operator==(Arc n)
339 339
        ///
340 340
        bool operator!=(Arc) const { return true; }
341 341

	
342 342
        /// Artificial ordering operator.
343 343

	
344 344
        /// To allow the use of graph descriptors as key type in std::map or
345 345
        /// similar associative container we require this.
346 346
        ///
347 347
        /// \note This operator only have to define some strict ordering of
348 348
        /// the items; this order has nothing to do with the iteration
349 349
        /// ordering of the items.
350 350
        bool operator<(Arc) const { return false; }
351 351

	
352 352
      };
353 353
      /// This iterator goes through each directed arc.
354 354

	
355 355
      /// This iterator goes through each arc of a graph.
356 356
      /// Its usage is quite simple, for example you can count the number
357 357
      /// of arcs in a graph \c g of type \c Graph as follows:
358 358
      ///\code
359 359
      /// int count=0;
360 360
      /// for(Graph::ArcIt e(g); e!=INVALID; ++e) ++count;
361 361
      ///\endcode
362 362
      class ArcIt : public Arc {
363 363
      public:
364 364
        /// Default constructor
365 365

	
366 366
        /// @warning The default constructor sets the iterator
367 367
        /// to an undefined value.
368 368
        ArcIt() { }
369 369
        /// Copy constructor.
370 370

	
371 371
        /// Copy constructor.
372 372
        ///
373 373
        ArcIt(const ArcIt& e) : Arc(e) { }
374 374
        /// Initialize the iterator to be invalid.
375 375

	
376 376
        /// Initialize the iterator to be invalid.
377 377
        ///
378 378
        ArcIt(Invalid) { }
379 379
        /// This constructor sets the iterator to the first arc.
380 380

	
381 381
        /// This constructor sets the iterator to the first arc of \c g.
382 382
        ///@param g the graph
383 383
        ArcIt(const Graph &g) { ignore_unused_variable_warning(g); }
384 384
        /// Arc -> ArcIt conversion
385 385

	
386 386
        /// Sets the iterator to the value of the trivial iterator \c e.
387 387
        /// This feature necessitates that each time we
388 388
        /// iterate the arc-set, the iteration order is the same.
389 389
        ArcIt(const Graph&, const Arc&) { }
390 390
        ///Next arc
391 391

	
392 392
        /// Assign the iterator to the next arc.
393 393
        ArcIt& operator++() { return *this; }
394 394
      };
395 395

	
396 396
      /// This iterator goes trough the outgoing directed arcs of a node.
397 397

	
398 398
      /// This iterator goes trough the \e outgoing arcs of a certain node
399 399
      /// of a graph.
400 400
      /// Its usage is quite simple, for example you can count the number
401 401
      /// of outgoing arcs of a node \c n
402 402
      /// in graph \c g of type \c Graph as follows.
403 403
      ///\code
404 404
      /// int count=0;
405 405
      /// for (Graph::OutArcIt e(g, n); e!=INVALID; ++e) ++count;
406 406
      ///\endcode
407 407

	
408 408
      class OutArcIt : public Arc {
409 409
      public:
410 410
        /// Default constructor
411 411

	
412 412
        /// @warning The default constructor sets the iterator
413 413
        /// to an undefined value.
414 414
        OutArcIt() { }
415 415
        /// Copy constructor.
416 416

	
417 417
        /// Copy constructor.
418 418
        ///
419 419
        OutArcIt(const OutArcIt& e) : Arc(e) { }
420 420
        /// Initialize the iterator to be invalid.
421 421

	
422 422
        /// Initialize the iterator to be invalid.
423 423
        ///
424 424
        OutArcIt(Invalid) { }
425 425
        /// This constructor sets the iterator to the first outgoing arc.
426 426

	
427 427
        /// This constructor sets the iterator to the first outgoing arc of
428 428
        /// the node.
429 429
        ///@param n the node
430 430
        ///@param g the graph
431 431
        OutArcIt(const Graph& n, const Node& g) {
432 432
          ignore_unused_variable_warning(n);
433 433
          ignore_unused_variable_warning(g);
434 434
        }
435 435
        /// Arc -> OutArcIt conversion
436 436

	
437 437
        /// Sets the iterator to the value of the trivial iterator.
438 438
        /// This feature necessitates that each time we
439 439
        /// iterate the arc-set, the iteration order is the same.
440 440
        OutArcIt(const Graph&, const Arc&) { }
441 441
        ///Next outgoing arc
442 442

	
443 443
        /// Assign the iterator to the next
444 444
        /// outgoing arc of the corresponding node.
445 445
        OutArcIt& operator++() { return *this; }
446 446
      };
447 447

	
448 448
      /// This iterator goes trough the incoming directed arcs of a node.
449 449

	
450 450
      /// This iterator goes trough the \e incoming arcs of a certain node
451 451
      /// of a graph.
452 452
      /// Its usage is quite simple, for example you can count the number
453 453
      /// of outgoing arcs of a node \c n
454 454
      /// in graph \c g of type \c Graph as follows.
455 455
      ///\code
456 456
      /// int count=0;
457 457
      /// for(Graph::InArcIt e(g, n); e!=INVALID; ++e) ++count;
458 458
      ///\endcode
459 459

	
460 460
      class InArcIt : public Arc {
461 461
      public:
462 462
        /// Default constructor
463 463

	
464 464
        /// @warning The default constructor sets the iterator
465 465
        /// to an undefined value.
466 466
        InArcIt() { }
467 467
        /// Copy constructor.
468 468

	
469 469
        /// Copy constructor.
470 470
        ///
471 471
        InArcIt(const InArcIt& e) : Arc(e) { }
472 472
        /// Initialize the iterator to be invalid.
473 473

	
474 474
        /// Initialize the iterator to be invalid.
475 475
        ///
476 476
        InArcIt(Invalid) { }
477 477
        /// This constructor sets the iterator to first incoming arc.
478 478

	
479 479
        /// This constructor set the iterator to the first incoming arc of
480 480
        /// the node.
481 481
        ///@param n the node
482 482
        ///@param g the graph
483 483
        InArcIt(const Graph& g, const Node& n) {
484 484
          ignore_unused_variable_warning(n);
485 485
          ignore_unused_variable_warning(g);
486 486
        }
487 487
        /// Arc -> InArcIt conversion
488 488

	
489 489
        /// Sets the iterator to the value of the trivial iterator \c e.
490 490
        /// This feature necessitates that each time we
491 491
        /// iterate the arc-set, the iteration order is the same.
492 492
        InArcIt(const Graph&, const Arc&) { }
493 493
        /// Next incoming arc
494 494

	
495 495
        /// Assign the iterator to the next inarc of the corresponding node.
496 496
        ///
497 497
        InArcIt& operator++() { return *this; }
498 498
      };
499 499

	
500 500
      /// \brief Read write map of the nodes to type \c T.
501 501
      ///
502 502
      /// ReadWrite map of the nodes to type \c T.
503 503
      /// \sa Reference
504 504
      template<class T>
505 505
      class NodeMap : public ReadWriteMap< Node, T >
506 506
      {
507 507
      public:
508 508

	
509 509
        ///\e
510 510
        NodeMap(const Graph&) { }
511 511
        ///\e
512 512
        NodeMap(const Graph&, T) { }
513 513

	
514 514
      private:
515 515
        ///Copy constructor
516 516
        NodeMap(const NodeMap& nm) : ReadWriteMap< Node, T >(nm) { }
517 517
        ///Assignment operator
518 518
        template <typename CMap>
519 519
        NodeMap& operator=(const CMap&) {
520 520
          checkConcept<ReadMap<Node, T>, CMap>();
521 521
          return *this;
522 522
        }
523 523
      };
524 524

	
525 525
      /// \brief Read write map of the directed arcs to type \c T.
526 526
      ///
527 527
      /// Reference map of the directed arcs to type \c T.
528 528
      /// \sa Reference
529 529
      template<class T>
530 530
      class ArcMap : public ReadWriteMap<Arc,T>
531 531
      {
532 532
      public:
533 533

	
534 534
        ///\e
535 535
        ArcMap(const Graph&) { }
536 536
        ///\e
537 537
        ArcMap(const Graph&, T) { }
538 538
      private:
539 539
        ///Copy constructor
540 540
        ArcMap(const ArcMap& em) : ReadWriteMap<Arc,T>(em) { }
541 541
        ///Assignment operator
542 542
        template <typename CMap>
543 543
        ArcMap& operator=(const CMap&) {
544 544
          checkConcept<ReadMap<Arc, T>, CMap>();
545 545
          return *this;
546 546
        }
547 547
      };
548 548

	
549 549
      /// Read write map of the edges to type \c T.
550 550

	
551 551
      /// Reference map of the arcs to type \c T.
552 552
      /// \sa Reference
553 553
      template<class T>
554 554
      class EdgeMap : public ReadWriteMap<Edge,T>
555 555
      {
556 556
      public:
557 557

	
558 558
        ///\e
559 559
        EdgeMap(const Graph&) { }
560 560
        ///\e
561 561
        EdgeMap(const Graph&, T) { }
562 562
      private:
563 563
        ///Copy constructor
564 564
        EdgeMap(const EdgeMap& em) : ReadWriteMap<Edge,T>(em) {}
565 565
        ///Assignment operator
566 566
        template <typename CMap>
567 567
        EdgeMap& operator=(const CMap&) {
568 568
          checkConcept<ReadMap<Edge, T>, CMap>();
569 569
          return *this;
570 570
        }
571 571
      };
572 572

	
573 573
      /// \brief Direct the given edge.
574 574
      ///
575 575
      /// Direct the given edge. The returned arc source
576 576
      /// will be the given node.
577 577
      Arc direct(const Edge&, const Node&) const {
578 578
        return INVALID;
579 579
      }
580 580

	
581 581
      /// \brief Direct the given edge.
582 582
      ///
583 583
      /// Direct the given edge. The returned arc
584 584
      /// represents the given edge and the direction comes
585 585
      /// from the bool parameter. The source of the edge and
586 586
      /// the directed arc is the same when the given bool is true.
587 587
      Arc direct(const Edge&, bool) const {
588 588
        return INVALID;
589 589
      }
590 590

	
591 591
      /// \brief Returns true if the arc has default orientation.
592 592
      ///
593 593
      /// Returns whether the given directed arc is same orientation as
594 594
      /// the corresponding edge's default orientation.
595 595
      bool direction(Arc) const { return true; }
596 596

	
597 597
      /// \brief Returns the opposite directed arc.
598 598
      ///
599 599
      /// Returns the opposite directed arc.
600 600
      Arc oppositeArc(Arc) const { return INVALID; }
601 601

	
602 602
      /// \brief Opposite node on an arc
603 603
      ///
604
      /// \return the opposite of the given Node on the given Edge
604
      /// \return The opposite of the given node on the given edge.
605 605
      Node oppositeNode(Node, Edge) const { return INVALID; }
606 606

	
607 607
      /// \brief First node of the edge.
608 608
      ///
609
      /// \return the first node of the given Edge.
609
      /// \return The first node of the given edge.
610 610
      ///
611 611
      /// Naturally edges don't have direction and thus
612
      /// don't have source and target node. But we use these two methods
613
      /// to query the two nodes of the arc. The direction of the arc
614
      /// which arises this way is called the inherent direction of the
612
      /// don't have source and target node. However we use \c u() and \c v()
613
      /// methods to query the two nodes of the arc. The direction of the
614
      /// arc which arises this way is called the inherent direction of the
615 615
      /// edge, and is used to define the "default" direction
616 616
      /// of the directed versions of the arcs.
617
      /// \sa direction
617
      /// \sa v()
618
      /// \sa direction()
618 619
      Node u(Edge) const { return INVALID; }
619 620

	
620 621
      /// \brief Second node of the edge.
622
      ///
623
      /// \return The second node of the given edge.
624
      ///
625
      /// Naturally edges don't have direction and thus
626
      /// don't have source and target node. However we use \c u() and \c v()
627
      /// methods to query the two nodes of the arc. The direction of the
628
      /// arc which arises this way is called the inherent direction of the
629
      /// edge, and is used to define the "default" direction
630
      /// of the directed versions of the arcs.
631
      /// \sa u()
632
      /// \sa direction()
621 633
      Node v(Edge) const { return INVALID; }
622 634

	
623 635
      /// \brief Source node of the directed arc.
624 636
      Node source(Arc) const { return INVALID; }
625 637

	
626 638
      /// \brief Target node of the directed arc.
627 639
      Node target(Arc) const { return INVALID; }
628 640

	
629 641
      /// \brief Returns the id of the node.
630 642
      int id(Node) const { return -1; }
631 643

	
632 644
      /// \brief Returns the id of the edge.
633 645
      int id(Edge) const { return -1; }
634 646

	
635 647
      /// \brief Returns the id of the arc.
636 648
      int id(Arc) const { return -1; }
637 649

	
638 650
      /// \brief Returns the node with the given id.
639 651
      ///
640 652
      /// \pre The argument should be a valid node id in the graph.
641 653
      Node nodeFromId(int) const { return INVALID; }
642 654

	
643 655
      /// \brief Returns the edge with the given id.
644 656
      ///
645 657
      /// \pre The argument should be a valid edge id in the graph.
646 658
      Edge edgeFromId(int) const { return INVALID; }
647 659

	
648 660
      /// \brief Returns the arc with the given id.
649 661
      ///
650 662
      /// \pre The argument should be a valid arc id in the graph.
651 663
      Arc arcFromId(int) const { return INVALID; }
652 664

	
653 665
      /// \brief Returns an upper bound on the node IDs.
654 666
      int maxNodeId() const { return -1; }
655 667

	
656 668
      /// \brief Returns an upper bound on the edge IDs.
657 669
      int maxEdgeId() const { return -1; }
658 670

	
659 671
      /// \brief Returns an upper bound on the arc IDs.
660 672
      int maxArcId() const { return -1; }
661 673

	
662 674
      void first(Node&) const {}
663 675
      void next(Node&) const {}
664 676

	
665 677
      void first(Edge&) const {}
666 678
      void next(Edge&) const {}
667 679

	
668 680
      void first(Arc&) const {}
669 681
      void next(Arc&) const {}
670 682

	
671 683
      void firstOut(Arc&, Node) const {}
672 684
      void nextOut(Arc&) const {}
673 685

	
674 686
      void firstIn(Arc&, Node) const {}
675 687
      void nextIn(Arc&) const {}
676 688

	
677 689
      void firstInc(Edge &, bool &, const Node &) const {}
678 690
      void nextInc(Edge &, bool &) const {}
679 691

	
680 692
      // The second parameter is dummy.
681 693
      Node fromId(int, Node) const { return INVALID; }
682 694
      // The second parameter is dummy.
683 695
      Edge fromId(int, Edge) const { return INVALID; }
684 696
      // The second parameter is dummy.
685 697
      Arc fromId(int, Arc) const { return INVALID; }
686 698

	
687 699
      // Dummy parameter.
688 700
      int maxId(Node) const { return -1; }
689 701
      // Dummy parameter.
690 702
      int maxId(Edge) const { return -1; }
691 703
      // Dummy parameter.
692 704
      int maxId(Arc) const { return -1; }
693 705

	
694 706
      /// \brief Base node of the iterator
695 707
      ///
696 708
      /// Returns the base node (the source in this case) of the iterator
697 709
      Node baseNode(OutArcIt e) const {
698 710
        return source(e);
699 711
      }
700 712
      /// \brief Running node of the iterator
701 713
      ///
702 714
      /// Returns the running node (the target in this case) of the
703 715
      /// iterator
704 716
      Node runningNode(OutArcIt e) const {
705 717
        return target(e);
706 718
      }
707 719

	
708 720
      /// \brief Base node of the iterator
709 721
      ///
710 722
      /// Returns the base node (the target in this case) of the iterator
711 723
      Node baseNode(InArcIt e) const {
712 724
        return target(e);
713 725
      }
714 726
      /// \brief Running node of the iterator
715 727
      ///
716 728
      /// Returns the running node (the source in this case) of the
717 729
      /// iterator
718 730
      Node runningNode(InArcIt e) const {
719 731
        return source(e);
720 732
      }
721 733

	
722 734
      /// \brief Base node of the iterator
723 735
      ///
724 736
      /// Returns the base node of the iterator
725 737
      Node baseNode(IncEdgeIt) const {
726 738
        return INVALID;
727 739
      }
728 740

	
729 741
      /// \brief Running node of the iterator
730 742
      ///
731 743
      /// Returns the running node of the iterator
732 744
      Node runningNode(IncEdgeIt) const {
733 745
        return INVALID;
734 746
      }
735 747

	
736 748
      template <typename _Graph>
737 749
      struct Constraints {
738 750
        void constraints() {
739 751
          checkConcept<IterableGraphComponent<>, _Graph>();
740 752
          checkConcept<IDableGraphComponent<>, _Graph>();
741 753
          checkConcept<MappableGraphComponent<>, _Graph>();
742 754
        }
743 755
      };
744 756

	
745 757
    };
746 758

	
747 759
  }
748 760

	
749 761
}
750 762

	
751 763
#endif

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