lemon/suurballe.h
author deba
Wed, 07 Mar 2007 12:00:59 +0000
changeset 2400 b199ded24c19
parent 2378 c479eab00a18
child 2553 bfced05fa852
permissions -rw-r--r--
Steiner 2-approximation demo
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/* -*- C++ -*-
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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) 2003-2007
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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_SUURBALLE_H
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#define LEMON_SUURBALLE_H
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///\ingroup shortest_path
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///\file
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///\brief An algorithm for finding k paths of minimal total length.
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#include <lemon/maps.h>
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#include <vector>
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#include <lemon/path.h>
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#include <lemon/ssp_min_cost_flow.h>
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namespace lemon {
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/// \addtogroup shortest_path
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/// @{
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  ///\brief Implementation of an algorithm for finding k edge-disjoint
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  /// paths between 2 nodes of minimal total length
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  ///
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  /// The class \ref lemon::Suurballe implements
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  /// an algorithm for finding k edge-disjoint paths
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  /// from a given source node to a given target node in an
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  /// edge-weighted directed graph having minimal total weight (length).
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  ///
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  ///\warning Length values should be nonnegative!
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  /// 
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  ///\param Graph The directed graph type the algorithm runs on.
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  ///\param LengthMap The type of the length map (values should be nonnegative).
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  ///
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  ///\note It it questionable whether it is correct to call this method after
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  ///%Suurballe for it is just a special case of Edmonds' and Karp's algorithm
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  ///for finding minimum cost flows. In fact, this implementation just
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  ///wraps the SspMinCostFlow algorithms. The paper of both %Suurballe and
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  ///Edmonds-Karp published in 1972, therefore it is possibly right to
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  ///state that they are
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  ///independent results. Most frequently this special case is referred as
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  ///%Suurballe method in the literature, especially in communication
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  ///network context.
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  ///\author Attila Bernath
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  template <typename Graph, typename LengthMap>
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  class Suurballe{
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    typedef typename LengthMap::Value Length;
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    typedef typename Graph::Node Node;
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    typedef typename Graph::NodeIt NodeIt;
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    typedef typename Graph::Edge Edge;
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    typedef typename Graph::OutEdgeIt OutEdgeIt;
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    typedef typename Graph::template EdgeMap<int> EdgeIntMap;
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    typedef ConstMap<Edge,int> ConstMap;
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    const Graph& G;
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    Node s;
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    Node t;
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    //Auxiliary variables
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    //This is the capacity map for the mincostflow problem
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    ConstMap const1map;
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    //This MinCostFlow instance will actually solve the problem
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    SspMinCostFlow<Graph, LengthMap, ConstMap> min_cost_flow;
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    //Container to store found paths
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    std::vector<SimplePath<Graph> > paths;
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  public :
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    /// \brief The constructor of the class.
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    ///
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    /// \param _G The directed graph the algorithm runs on. 
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    /// \param _length The length (weight or cost) of the edges. 
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    /// \param _s Source node.
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    /// \param _t Target node.
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    Suurballe(Graph& _G, LengthMap& _length, Node _s, Node _t) : 
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      G(_G), s(_s), t(_t), const1map(1), 
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      min_cost_flow(_G, _length, const1map, _s, _t) { }
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    /// \brief Runs the algorithm.
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    ///
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    /// Runs the algorithm.
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    /// Returns k if there are at least k edge-disjoint paths from s to t.
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    /// Otherwise it returns the number of edge-disjoint paths found 
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    /// from s to t.
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    ///
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    /// \param k How many paths are we looking for?
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    ///
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    int run(int k) {
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      int i = min_cost_flow.run(k);
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      //Let's find the paths
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      //We put the paths into stl vectors (as an inner representation). 
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      //In the meantime we lose the information stored in 'reversed'.
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      //We suppose the lengths to be positive now.
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      //We don't want to change the flow of min_cost_flow, so we make a copy
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      //The name here suggests that the flow has only 0/1 values.
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      EdgeIntMap reversed(G); 
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      for(typename Graph::EdgeIt e(G); e!=INVALID; ++e) 
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	reversed[e] = min_cost_flow.getFlow()[e];
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      paths.clear();
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      paths.resize(k);
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      for (int j=0; j<i; ++j){
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	Node n=s;
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	while (n!=t){
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	  OutEdgeIt e(G, n);
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	  while (!reversed[e]){
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	    ++e;
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	  }
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	  n = G.target(e);
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	  paths[j].addBack(e);
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	  reversed[e] = 1-reversed[e];
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	}
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      }
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      return i;
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    }
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    /// \brief Returns the total length of the paths.
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    ///
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    /// This function gives back the total length of the found paths.
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    Length totalLength(){
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      return min_cost_flow.totalLength();
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    }
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    /// \brief Returns the found flow.
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    ///
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    /// This function returns a const reference to the EdgeMap \c flow.
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    const EdgeIntMap &getFlow() const { return min_cost_flow.flow;}
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    /// \brief Returns the optimal dual solution
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    ///
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    /// This function returns a const reference to the NodeMap \c
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    /// potential (the dual solution).
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    const EdgeIntMap &getPotential() const { return min_cost_flow.potential;}
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    /// \brief Checks whether the complementary slackness holds.
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    ///
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    /// This function checks, whether the given solution is optimal.
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    /// Currently this function only checks optimality, doesn't bother
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    /// with feasibility.  It is meant for testing purposes.
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    bool checkComplementarySlackness(){
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      return min_cost_flow.checkComplementarySlackness();
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    }
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    typedef SimplePath<Graph> Path; 
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    /// \brief Read the found paths.
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    ///
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    /// This function gives back the \c j-th path in argument p.
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    /// Assumes that \c run() has been run and nothing has changed
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    /// since then.
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    ///
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    /// \warning It is assumed that \c p is constructed to be a path
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    /// of graph \c G.  If \c j is not less than the result of
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    /// previous \c run, then the result here will be an empty path
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    /// (\c j can be 0 as well).
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    ///
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    /// \param j Which path you want to get from the found paths (in a
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    /// real application you would get the found paths iteratively).
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    Path path(int j) const {
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      return paths[j];
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    }
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    /// \brief Gives back the number of the paths.
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    ///
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    /// Gives back the number of the constructed paths.
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    int pathNum() const {
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      return paths.size();
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    }
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  }; //class Suurballe
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  ///@}
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} //namespace lemon
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#endif //LEMON_SUURBALLE_H