lemon/min_cost_flow.h
author deba
Wed, 21 Dec 2005 08:47:38 +0000
changeset 1868 24bf4b8299e7
parent 1527 7ceab500e1f6
child 1875 98698b69a902
permissions -rw-r--r--
Bug fix in bipartite graph
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/* -*- C++ -*-
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 * lemon/min_cost_flow.h - Part of LEMON, a generic C++ optimization library
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 *
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 * Copyright (C) 2005 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_MIN_COST_FLOW_H
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#define LEMON_MIN_COST_FLOW_H
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///\ingroup flowalgs
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///\file
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///\brief An algorithm for finding a flow of value \c k (for small values of \c k) having minimal total cost 
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#include <lemon/dijkstra.h>
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#include <lemon/graph_adaptor.h>
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#include <lemon/maps.h>
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#include <vector>
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namespace lemon {
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/// \addtogroup flowalgs
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/// @{
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  ///\brief Implementation of an algorithm for finding a flow of value \c k 
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  ///(for small values of \c k) having minimal total cost between 2 nodes 
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  /// 
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  ///
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  /// The class \ref lemon::MinCostFlow "MinCostFlow" implements an
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  /// algorithm for finding a flow of value \c k having minimal total
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  /// cost from a given source node to a given target node in a
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  /// directed graph with a cost function on the edges. To
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  /// this end, the edge-capacities and edge-costs have to be
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  /// nonnegative.  The edge-capacities should be integers, but the
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  /// edge-costs can be integers, reals or of other comparable
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  /// numeric type.  This algorithm is intended to be used only for
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  /// small values of \c k, since it is only polynomial in k, not in
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  /// the length of k (which is log k): in order to find the minimum
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  /// cost flow of value \c k it finds the minimum cost flow of value
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  /// \c i for every \c i between 0 and \c k.
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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.
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  ///\param CapacityMap The capacity map type.
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  ///
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  ///\author Attila Bernath
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  template <typename Graph, typename LengthMap, typename CapacityMap>
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  class MinCostFlow {
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    typedef typename LengthMap::Value Length;
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    //Warning: this should be integer type
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    typedef typename CapacityMap::Value Capacity;
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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 ResGraphAdaptor<const Graph,int,CapacityMap,EdgeIntMap> ResGW;
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    typedef typename ResGW::Edge ResGraphEdge;
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  protected:
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    const Graph& g;
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    const LengthMap& length;
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    const CapacityMap& capacity;
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    EdgeIntMap flow; 
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    typedef typename Graph::template NodeMap<Length> PotentialMap;
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    PotentialMap potential;
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    Node s;
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    Node t;
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    Length total_length;
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    class ModLengthMap {   
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      typedef typename Graph::template NodeMap<Length> NodeMap;
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      const ResGW& g;
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      const LengthMap &length;
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      const NodeMap &pot;
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    public :
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      typedef typename LengthMap::Key Key;
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      typedef typename LengthMap::Value Value;
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      ModLengthMap(const ResGW& _g, 
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		   const LengthMap &_length, const NodeMap &_pot) : 
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	g(_g), /*rev(_rev),*/ length(_length), pot(_pot) { }
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      Value operator[](typename ResGW::Edge e) const {     
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	if (g.forward(e))
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	  return  length[e]-(pot[g.target(e)]-pot[g.source(e)]);   
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	else
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	  return -length[e]-(pot[g.target(e)]-pot[g.source(e)]);   
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      }     
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    }; //ModLengthMap
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    ResGW res_graph;
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    ModLengthMap mod_length;
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    Dijkstra<ResGW, ModLengthMap> dijkstra;
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  public :
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    /*! \brief The constructor of the class.
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    \param _g The directed graph the algorithm runs on. 
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    \param _length The length (cost) of the edges. 
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    \param _cap The capacity of the edges. 
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    \param _s Source node.
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    \param _t Target node.
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    */
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    MinCostFlow(Graph& _g, LengthMap& _length, CapacityMap& _cap, 
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		Node _s, Node _t) : 
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      g(_g), length(_length), capacity(_cap), flow(_g), potential(_g), 
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      s(_s), t(_t), 
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      res_graph(g, capacity, flow), 
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      mod_length(res_graph, length, potential),
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      dijkstra(res_graph, mod_length) { 
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      reset();
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      }
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    /*! Tries to augment the flow between s and t by 1.
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      The return value shows if the augmentation is successful.
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     */
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    bool augment() {
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      dijkstra.run(s);
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      if (!dijkstra.reached(t)) {
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	//Unsuccessful augmentation.
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	return false;
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      } else {
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	//We have to change the potential
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	for(typename ResGW::NodeIt n(res_graph); n!=INVALID; ++n)
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	  potential.set(n, potential[n]+dijkstra.distMap()[n]);
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	//Augmenting on the shortest path
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	Node n=t;
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	ResGraphEdge e;
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	while (n!=s){
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	  e = dijkstra.predEdge(n);
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	  n = dijkstra.predNode(n);
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	  res_graph.augment(e,1);
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	  //Let's update the total length
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	  if (res_graph.forward(e))
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	    total_length += length[e];
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	  else 
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	    total_length -= length[e];	    
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	}
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	return true;
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      }
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    }
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    /*! \brief Runs the algorithm.
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    Runs the algorithm.
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    Returns k if there is a flow of value at least k from s to t.
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    Otherwise it returns the maximum value of a flow from s to t.
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    \param k The value of the flow we are looking for.
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    \todo May be it does make sense to be able to start with a nonzero 
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    feasible primal-dual solution pair as well.
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    \todo If the actual flow value is bigger than k, then everything is 
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    cleared and the algorithm starts from zero flow. Is it a good approach?
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    */
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    int run(int k) {
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      if (flowValue()>k) reset();
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      while (flowValue()<k && augment()) { }
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      return flowValue();
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    }
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    /*! \brief The class is reset to zero flow and potential.
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      The class is reset to zero flow and potential.
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     */
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    void reset() {
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      total_length=0;
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      for (typename Graph::EdgeIt e(g); e!=INVALID; ++e) flow.set(e, 0);
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      for (typename Graph::NodeIt n(g); n!=INVALID; ++n) potential.set(n, 0);  
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    }
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    /*! Returns the value of the actual flow. 
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     */
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    int flowValue() const {
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      int i=0;
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      for (typename Graph::OutEdgeIt e(g, s); e!=INVALID; ++e) i+=flow[e];
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      for (typename Graph::InEdgeIt e(g, s); e!=INVALID; ++e) i-=flow[e];
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      return i;
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    }
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    /// Total cost of the found flow.
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    /// This function gives back the total cost of the found flow.
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    Length totalLength(){
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      return total_length;
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    }
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    ///Returns a const reference to the EdgeMap \c flow. 
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    ///Returns a const reference to the EdgeMap \c flow. 
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    const EdgeIntMap &getFlow() const { return flow;}
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    /*! \brief Returns a const reference to the NodeMap \c potential (the dual solution).
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    Returns a const reference to the NodeMap \c potential (the dual solution).
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    */
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    const PotentialMap &getPotential() const { return potential;}
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    /*! \brief Checking the complementary slackness optimality criteria.
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    This function checks, whether the given flow and potential 
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    satisfy the complementary slackness conditions (i.e. these are optimal).
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    This function only checks optimality, doesn't bother with feasibility.
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    For testing purpose.
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    */
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    bool checkComplementarySlackness(){
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      Length mod_pot;
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      Length fl_e;
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        for(typename Graph::EdgeIt e(g); e!=INVALID; ++e) {
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	//C^{\Pi}_{i,j}
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	mod_pot = length[e]-potential[g.target(e)]+potential[g.source(e)];
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	fl_e = flow[e];
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	if (0<fl_e && fl_e<capacity[e]) {
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	  /// \todo better comparison is needed for real types, moreover, 
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	  /// this comparison here is superfluous.
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	  if (mod_pot != 0)
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	    return false;
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	} 
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	else {
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	  if (mod_pot > 0 && fl_e != 0)
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	    return false;
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	  if (mod_pot < 0 && fl_e != capacity[e])
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	    return false;
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	}
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      }
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      return true;
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    }
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  }; //class MinCostFlow
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  ///@}
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} //namespace lemon
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#endif //LEMON_MIN_COST_FLOW_H