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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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#ifndef LEMON_EULER_H
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#define LEMON_EULER_H
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#include<lemon/core.h>
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#include<lemon/adaptors.h>
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#include<lemon/connectivity.h>
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#include <list>
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/// \ingroup graph_prop
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/// \file
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/// \brief Euler tour
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///
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///This file provides an Euler tour iterator and ways to check
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///if a digraph is euler.
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namespace lemon {
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///Euler iterator for digraphs.
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/// \ingroup graph_prop
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///This iterator converts to the \c Arc type of the digraph and using
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///operator ++, it provides an Euler tour of a \e directed
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///graph (if there exists).
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///
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///For example
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///if the given digraph is Euler (i.e it has only one nontrivial component
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///and the in-degree is equal to the out-degree for all nodes),
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///the following code will put the arcs of \c g
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///to the vector \c et according to an
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///Euler tour of \c g.
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///\code
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/// std::vector<ListDigraph::Arc> et;
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/// for(DiEulerIt<ListDigraph> e(g),e!=INVALID;++e)
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/// et.push_back(e);
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///\endcode
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///If \c g is not Euler then the resulted tour will not be full or closed.
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///\sa EulerIt
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template<typename GR>
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class DiEulerIt
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{
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typedef typename GR::Node Node;
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typedef typename GR::NodeIt NodeIt;
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typedef typename GR::Arc Arc;
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typedef typename GR::ArcIt ArcIt;
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typedef typename GR::OutArcIt OutArcIt;
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typedef typename GR::InArcIt InArcIt;
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const GR &g;
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typename GR::template NodeMap<OutArcIt> nedge;
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std::list<Arc> euler;
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public:
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///Constructor
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///\param gr A digraph.
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///\param start The starting point of the tour. If it is not given
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/// the tour will start from the first node.
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DiEulerIt(const GR &gr, typename GR::Node start = INVALID)
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: g(gr), nedge(g)
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{
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if(start==INVALID) start=NodeIt(g);
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for(NodeIt n(g);n!=INVALID;++n) nedge[n]=OutArcIt(g,n);
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while(nedge[start]!=INVALID) {
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euler.push_back(nedge[start]);
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Node next=g.target(nedge[start]);
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++nedge[start];
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start=next;
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}
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}
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///Arc Conversion
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operator Arc() { return euler.empty()?INVALID:euler.front(); }
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bool operator==(Invalid) { return euler.empty(); }
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bool operator!=(Invalid) { return !euler.empty(); }
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///Next arc of the tour
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DiEulerIt &operator++() {
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Node s=g.target(euler.front());
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euler.pop_front();
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//This produces a warning.Strange.
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//std::list<Arc>::iterator next=euler.begin();
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typename std::list<Arc>::iterator next=euler.begin();
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while(nedge[s]!=INVALID) {
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euler.insert(next,nedge[s]);
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Node n=g.target(nedge[s]);
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++nedge[s];
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s=n;
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}
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return *this;
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}
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///Postfix incrementation
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///\warning This incrementation
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///returns an \c Arc, not an \ref DiEulerIt, as one may
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///expect.
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Arc operator++(int)
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{
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Arc e=*this;
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++(*this);
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return e;
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}
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};
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///Euler iterator for graphs.
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/// \ingroup graph_prop
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///This iterator converts to the \c Arc (or \c Edge)
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///type of the digraph and using
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///operator ++, it provides an Euler tour of an undirected
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///digraph (if there exists).
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///
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///For example
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///if the given digraph if Euler (i.e it has only one nontrivial component
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///and the degree of each node is even),
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///the following code will print the arc IDs according to an
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///Euler tour of \c g.
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///\code
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/// for(EulerIt<ListGraph> e(g),e!=INVALID;++e) {
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/// std::cout << g.id(Edge(e)) << std::eol;
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/// }
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///\endcode
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///Although the iterator provides an Euler tour of an graph,
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///it still returns Arcs in order to indicate the direction of the tour.
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///(But Arc will convert to Edges, of course).
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///
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///If \c g is not Euler then the resulted tour will not be full or closed.
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///\sa EulerIt
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template<typename GR>
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class EulerIt
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{
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typedef typename GR::Node Node;
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typedef typename GR::NodeIt NodeIt;
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typedef typename GR::Arc Arc;
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typedef typename GR::Edge Edge;
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typedef typename GR::ArcIt ArcIt;
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typedef typename GR::OutArcIt OutArcIt;
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typedef typename GR::InArcIt InArcIt;
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const GR &g;
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typename GR::template NodeMap<OutArcIt> nedge;
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typename GR::template EdgeMap<bool> visited;
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std::list<Arc> euler;
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public:
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///Constructor
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///\param gr An graph.
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///\param start The starting point of the tour. If it is not given
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/// the tour will start from the first node.
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EulerIt(const GR &gr, typename GR::Node start = INVALID)
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: g(gr), nedge(g), visited(g, false)
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{
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if(start==INVALID) start=NodeIt(g);
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for(NodeIt n(g);n!=INVALID;++n) nedge[n]=OutArcIt(g,n);
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while(nedge[start]!=INVALID) {
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euler.push_back(nedge[start]);
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visited[nedge[start]]=true;
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Node next=g.target(nedge[start]);
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++nedge[start];
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start=next;
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while(nedge[start]!=INVALID && visited[nedge[start]]) ++nedge[start];
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}
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}
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///Arc Conversion
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operator Arc() const { return euler.empty()?INVALID:euler.front(); }
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///Arc Conversion
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operator Edge() const { return euler.empty()?INVALID:euler.front(); }
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///\e
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bool operator==(Invalid) const { return euler.empty(); }
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///\e
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bool operator!=(Invalid) const { return !euler.empty(); }
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///Next arc of the tour
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EulerIt &operator++() {
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Node s=g.target(euler.front());
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euler.pop_front();
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typename std::list<Arc>::iterator next=euler.begin();
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while(nedge[s]!=INVALID) {
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while(nedge[s]!=INVALID && visited[nedge[s]]) ++nedge[s];
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if(nedge[s]==INVALID) break;
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else {
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euler.insert(next,nedge[s]);
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visited[nedge[s]]=true;
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Node n=g.target(nedge[s]);
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++nedge[s];
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s=n;
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}
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}
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return *this;
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}
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///Postfix incrementation
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///\warning This incrementation
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///returns an \c Arc, not an \ref EulerIt, as one may
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///expect.
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Arc operator++(int)
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{
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Arc e=*this;
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++(*this);
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return e;
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}
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};
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///Checks if the graph is Eulerian
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/// \ingroup graph_prop
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///Checks if the graph is Eulerian. It works for both directed and undirected
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///graphs.
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///\note By definition, a digraph is called \e Eulerian if
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///and only if it is connected and the number of its incoming and outgoing
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///arcs are the same for each node.
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///Similarly, an undirected graph is called \e Eulerian if
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///and only if it is connected and the number of incident arcs is even
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///for each node. <em>Therefore, there are digraphs which are not Eulerian,
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///but still have an Euler tour</em>.
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template<typename GR>
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#ifdef DOXYGEN
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bool
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#else
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typename enable_if<UndirectedTagIndicator<GR>,bool>::type
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eulerian(const GR &g)
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{
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for(typename GR::NodeIt n(g);n!=INVALID;++n)
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if(countIncEdges(g,n)%2) return false;
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return connected(g);
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}
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template<class GR>
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typename disable_if<UndirectedTagIndicator<GR>,bool>::type
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#endif
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eulerian(const GR &g)
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{
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for(typename GR::NodeIt n(g);n!=INVALID;++n)
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if(countInArcs(g,n)!=countOutArcs(g,n)) return false;
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return connected(Undirector<const GR>(g));
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}
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}
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#endif
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