// -*- c++ -*-

 #ifndef HUGO_MINLENGTHPATHS_H

 #define HUGO_MINLENGTHPATHS_H

 ///\ingroup galgs

 ///\file

 ///\brief An algorithm for finding k paths of minimal total length.

 //#include <hugo/dijkstra.h>

 //#include <hugo/graph_wrapper.h>

 #include <hugo/maps.h>

 #include <vector>

 #include <hugo/mincostflows.h>

 #include <for_each_macros.h>

 namespace hugo {

 /// \addtogroup galgs

 /// @{

   ///\brief Implementation of an algorithm for finding k paths between 2 nodes 

   /// of minimal total length 

   ///

   /// The class \ref hugo::MinLengthPaths "MinLengthPaths" implements

   /// an algorithm for finding k edge-disjoint paths

   /// from a given source node to a given target node in an

   /// edge-weighted directed graph having minimal total weigth (length).

   ///

   ///\warning It is assumed that the lengths are positive, since the

   /// general flow-decomposition is not implemented yet.

   ///

   ///\author Attila Bernath

   template <typename Graph, typename LengthMap>

   class MinLengthPaths{

     typedef typename LengthMap::ValueType Length;

     typedef typename Graph::Node Node;

     typedef typename Graph::NodeIt NodeIt;

     typedef typename Graph::Edge Edge;

     typedef typename Graph::OutEdgeIt OutEdgeIt;

     typedef typename Graph::template EdgeMap<int> EdgeIntMap;

     typedef ConstMap<Edge,int> ConstMap;

     //Input

     const Graph& G;

     //Auxiliary variables

     //This is the capacity map for the mincostflow problem

     ConstMap const1map;

     //This MinCostFlows instance will actually solve the problem

     MinCostFlows<Graph, LengthMap, ConstMap> mincost_flow;

     //Container to store found paths

     std::vector< std::vector<Edge> > paths;

   public :

     MinLengthPaths(Graph& _G, LengthMap& _length) : G(_G),

       const1map(1), mincost_flow(_G, _length, const1map){}

     ///Runs the algorithm.

     ///Runs the algorithm.

     ///Returns k if there are at least k edge-disjoint paths from s to t.

    ///Otherwise it returns the number of found edge-disjoint paths from s to t.

     int run(Node s, Node t, int k) {

       int i = mincost_flow.run(s,t,k);

       //Let's find the paths

       //We put the paths into stl vectors (as an inner representation). 

       //In the meantime we lose the information stored in 'reversed'.

       //We suppose the lengths to be positive now.

       //We don't want to change the flow of mincost_flow, so we make a copy

       //The name here suggests that the flow has only 0/1 values.

       EdgeIntMap reversed(G); 

       FOR_EACH_LOC(typename Graph::EdgeIt, e, G){

 	reversed[e] = mincost_flow.getFlow()[e];

       }

       paths.clear();

       //total_length=0;

       paths.resize(k);

       for (int j=0; j<i; ++j){

 	Node n=s;

 	OutEdgeIt e;

 	while (n!=t){

 	  G.first(e,n);

 	  while (!reversed[e]){

 	    G.next(e);

 	  }

 	  n = G.head(e);

 	  paths[j].push_back(e);

 	  //total_length += length[e];

 	  reversed[e] = 1-reversed[e];

 	}

       }

       return i;

     }

     ///This function gives back the total length of the found paths.

     ///Assumes that \c run() has been run and nothing changed since then.

     Length totalLength(){

       return mincost_flow.totalLength();

     }

     ///Returns a const reference to the EdgeMap \c flow. \pre \ref run() must

     ///be called before using this function.

     const EdgeIntMap &getFlow() const { return mincost_flow.flow;}

   ///Returns a const reference to the NodeMap \c potential (the dual solution).

     /// \pre \ref run() must be called before using this function.

     const EdgeIntMap &getPotential() const { return mincost_flow.potential;}

     ///This function checks, whether the given solution is optimal

     ///Running after a \c run() should return with true

     ///In this "state of the art" this only checks optimality, doesn't bother with feasibility

     ///

     ///\todo Is this OK here?

     bool checkComplementarySlackness(){

       return mincost_flow.checkComplementarySlackness();

     }

     ///This function gives back the \c j-th path in argument p.

     ///Assumes that \c run() has been run and nothing changed since then.

     /// \warning It is assumed that \c p is constructed to be a path of graph \c G. If \c j is not less than the result of previous \c run, then the result here will be an empty path (\c j can be 0 as well).

     template<typename DirPath>

     void getPath(DirPath& p, size_t j){

       p.clear();

       if (j>paths.size()-1){

 	return;

       }

       typename DirPath::Builder B(p);

       for(typename std::vector<Edge>::iterator i=paths[j].begin(); 

 	  i!=paths[j].end(); ++i ){

 	B.pushBack(*i);

       }

       B.commit();

     }

   }; //class MinLengthPaths

   ///@}

 } //namespace hugo

 #endif //HUGO_MINLENGTHPATHS_H