/* -*- C++ -*- * lemon/belmann_ford.h - Part of LEMON, a generic C++ optimization library * * Copyright (C) 2005 Egervary Jeno Kombinatorikus Optimalizalasi Kutatocsoport * (Egervary Research Group on Combinatorial Optimization, EGRES). * * Permission to use, modify and distribute this software is granted * provided that this copyright notice appears in all copies. For * precise terms see the accompanying LICENSE file. * * This software is provided "AS IS" with no warranty of any kind, * express or implied, and with no claim as to its suitability for any * purpose. * */ #ifndef LEMON_BELMANN_FORD_H #define LEMON_BELMANN_FORD_H /// \ingroup flowalgs /// \file /// \brief BelmannFord algorithm. /// #include #include #include #include #include namespace lemon { /// \brief Default OperationTraits for the BelmannFord algorithm class. /// /// It defines all computational operations and constants which are /// used in the belmann ford algorithm. The default implementation /// is based on the numeric_limits class. If the numeric type does not /// have infinity value then the maximum value is used as extremal /// infinity value. template < typename Value, bool has_infinity = std::numeric_limits::has_infinity> struct BelmannFordDefaultOperationTraits { /// \brief Gives back the zero value of the type. static Value zero() { return static_cast(0); } /// \brief Gives back the positive infinity value of the type. static Value infinity() { return std::numeric_limits::infinity(); } /// \brief Gives back the sum of the given two elements. static Value plus(const Value& left, const Value& right) { return left + right; } /// \brief Gives back true only if the first value less than the second. static bool less(const Value& left, const Value& right) { return left < right; } }; template struct BelmannFordDefaultOperationTraits { static Value zero() { return static_cast(0); } static Value infinity() { return std::numeric_limits::max(); } static Value plus(const Value& left, const Value& right) { if (left == infinity() || right == infinity()) return infinity(); return left + right; } static bool less(const Value& left, const Value& right) { return left < right; } }; /// \brief Default traits class of BelmannFord class. /// /// Default traits class of BelmannFord class. /// \param _Graph Graph type. /// \param _LegthMap Type of length map. template struct BelmannFordDefaultTraits { /// The graph type the algorithm runs on. typedef _Graph Graph; /// \brief The type of the map that stores the edge lengths. /// /// The type of the map that stores the edge lengths. /// It must meet the \ref concept::ReadMap "ReadMap" concept. typedef _LengthMap LengthMap; // The type of the length of the edges. typedef typename _LengthMap::Value Value; /// \brief Operation traits for belmann-ford algorithm. /// /// It defines the infinity type on the given Value type /// and the used operation. /// \see BelmannFordDefaultOperationTraits typedef BelmannFordDefaultOperationTraits OperationTraits; /// \brief The type of the map that stores the last edges of the /// shortest paths. /// /// The type of the map that stores the last /// edges of the shortest paths. /// It must meet the \ref concept::WriteMap "WriteMap" concept. /// typedef typename Graph::template NodeMap PredMap; /// \brief Instantiates a PredMap. /// /// This function instantiates a \ref PredMap. /// \param graph is the graph, to which we would like to define the PredMap. static PredMap *createPredMap(const _Graph& graph) { return new PredMap(graph); } /// \brief The type of the map that stores the dists of the nodes. /// /// The type of the map that stores the dists of the nodes. /// It must meet the \ref concept::WriteMap "WriteMap" concept. /// typedef typename Graph::template NodeMap DistMap; /// \brief Instantiates a DistMap. /// /// This function instantiates a \ref DistMap. /// \param graph is the graph, to which we would like to define the /// \ref DistMap static DistMap *createDistMap(const _Graph& graph) { return new DistMap(graph); } }; /// \brief %BelmannFord algorithm class. /// /// \ingroup flowalgs /// This class provides an efficient implementation of \c Belmann-Ford /// algorithm. The edge lengths are passed to the algorithm using a /// \ref concept::ReadMap "ReadMap", so it is easy to change it to any /// kind of length. /// /// The Belmann-Ford algorithm solves the shortest path from one node /// problem when the edges can have negative length but the graph should /// not contain cycles with negative sum of length. If we can assume /// that all edge is non-negative in the graph then the dijkstra algorithm /// should be used rather. /// /// The complexity of the algorithm is O(n * e). /// /// The type of the length is determined by the /// \ref concept::ReadMap::Value "Value" of the length map. /// /// \param _Graph The graph type the algorithm runs on. The default value /// is \ref ListGraph. The value of _Graph is not used directly by /// BelmannFord, it is only passed to \ref BelmannFordDefaultTraits. /// \param _LengthMap This read-only EdgeMap determines the lengths of the /// edges. The default map type is \ref concept::StaticGraph::EdgeMap /// "Graph::EdgeMap". The value of _LengthMap is not used directly /// by BelmannFord, it is only passed to \ref BelmannFordDefaultTraits. /// \param _Traits Traits class to set various data types used by the /// algorithm. The default traits class is \ref BelmannFordDefaultTraits /// "BelmannFordDefaultTraits<_Graph,_LengthMap>". See \ref /// BelmannFordDefaultTraits for the documentation of a BelmannFord traits /// class. /// /// \author Balazs Dezso #ifdef DOXYGEN template #else template , typename _Traits=BelmannFordDefaultTraits<_Graph,_LengthMap> > #endif class BelmannFord { public: /// \brief \ref Exception for uninitialized parameters. /// /// This error represents problems in the initialization /// of the parameters of the algorithms. class UninitializedParameter : public lemon::UninitializedParameter { public: virtual const char* exceptionName() const { return "lemon::BelmannFord::UninitializedParameter"; } }; typedef _Traits Traits; ///The type of the underlying graph. typedef typename _Traits::Graph Graph; typedef typename Graph::Node Node; typedef typename Graph::NodeIt NodeIt; typedef typename Graph::Edge Edge; typedef typename Graph::OutEdgeIt OutEdgeIt; /// \brief The type of the length of the edges. typedef typename _Traits::LengthMap::Value Value; /// \brief The type of the map that stores the edge lengths. typedef typename _Traits::LengthMap LengthMap; /// \brief The type of the map that stores the last /// edges of the shortest paths. typedef typename _Traits::PredMap PredMap; /// \brief The type of the map that stores the dists of the nodes. typedef typename _Traits::DistMap DistMap; /// \brief The operation traits. typedef typename _Traits::OperationTraits OperationTraits; private: /// Pointer to the underlying graph. const Graph *graph; /// Pointer to the length map const LengthMap *length; ///Pointer to the map of predecessors edges. PredMap *_pred; ///Indicates if \ref _pred is locally allocated (\c true) or not. bool local_pred; ///Pointer to the map of distances. DistMap *_dist; ///Indicates if \ref _dist is locally allocated (\c true) or not. bool local_dist; typedef typename Graph::template NodeMap MaskMap; MaskMap *_mask; std::vector _process; /// Creates the maps if necessary. void create_maps() { if(!_pred) { local_pred = true; _pred = Traits::createPredMap(*graph); } if(!_dist) { local_dist = true; _dist = Traits::createDistMap(*graph); } _mask = new MaskMap(*graph, false); } public : typedef BelmannFord Create; /// \name Named template parameters ///@{ template struct DefPredMapTraits : public Traits { typedef T PredMap; static PredMap *createPredMap(const Graph&) { throw UninitializedParameter(); } }; /// \brief \ref named-templ-param "Named parameter" for setting PredMap /// type /// \ref named-templ-param "Named parameter" for setting PredMap type /// template struct DefPredMap : public BelmannFord< Graph, LengthMap, DefPredMapTraits > { typedef BelmannFord< Graph, LengthMap, DefPredMapTraits > Create; }; template struct DefDistMapTraits : public Traits { typedef T DistMap; static DistMap *createDistMap(const Graph& graph) { throw UninitializedParameter(); } }; /// \brief \ref named-templ-param "Named parameter" for setting DistMap /// type /// /// \ref named-templ-param "Named parameter" for setting DistMap type /// template struct DefDistMap : public BelmannFord< Graph, LengthMap, DefDistMapTraits > { typedef BelmannFord< Graph, LengthMap, DefDistMapTraits > Create; }; template struct DefOperationTraitsTraits : public Traits { typedef T OperationTraits; }; /// \brief \ref named-templ-param "Named parameter" for setting /// OperationTraits type /// /// \ref named-templ-param "Named parameter" for setting OperationTraits /// type template struct DefOperationTraits : public BelmannFord< Graph, LengthMap, DefOperationTraitsTraits > { typedef BelmannFord< Graph, LengthMap, DefOperationTraitsTraits > Create; }; ///@} protected: BelmannFord() {} public: /// \brief Constructor. /// /// \param _graph the graph the algorithm will run on. /// \param _length the length map used by the algorithm. BelmannFord(const Graph& _graph, const LengthMap& _length) : graph(&_graph), length(&_length), _pred(0), local_pred(false), _dist(0), local_dist(false) {} ///Destructor. ~BelmannFord() { if(local_pred) delete _pred; if(local_dist) delete _dist; delete _mask; } /// \brief Sets the length map. /// /// Sets the length map. /// \return \c (*this) BelmannFord &lengthMap(const LengthMap &m) { length = &m; return *this; } /// \brief Sets the map storing the predecessor edges. /// /// Sets the map storing the predecessor edges. /// If you don't use this function before calling \ref run(), /// it will allocate one. The destuctor deallocates this /// automatically allocated map, of course. /// \return \c (*this) BelmannFord &predMap(PredMap &m) { if(local_pred) { delete _pred; local_pred=false; } _pred = &m; return *this; } /// \brief Sets the map storing the distances calculated by the algorithm. /// /// Sets the map storing the distances calculated by the algorithm. /// If you don't use this function before calling \ref run(), /// it will allocate one. The destuctor deallocates this /// automatically allocated map, of course. /// \return \c (*this) BelmannFord &distMap(DistMap &m) { if(local_dist) { delete _dist; local_dist=false; } _dist = &m; return *this; } /// \name Execution control /// The simplest way to execute the algorithm is to use /// one of the member functions called \c run(...). /// \n /// If you need more control on the execution, /// first you must call \ref init(), then you can add several source nodes /// with \ref addSource(). /// Finally \ref start() will perform the actual path /// computation. ///@{ /// \brief Initializes the internal data structures. /// /// Initializes the internal data structures. void init(const Value value = OperationTraits::infinity()) { create_maps(); for (NodeIt it(*graph); it != INVALID; ++it) { _pred->set(it, INVALID); _dist->set(it, value); } _process.clear(); if (OperationTraits::less(value, OperationTraits::infinity())) { for (NodeIt it(*graph); it != INVALID; ++it) { _process.push_back(it); _mask->set(it, true); } } } /// \brief Adds a new source node. /// /// The optional second parameter is the initial distance of the node. /// It just sets the distance of the node to the given value. void addSource(Node source, Value dst = OperationTraits::zero()) { _dist->set(source, dst); if (!(*_mask)[source]) { _process.push_back(source); _mask->set(source, true); } } /// \brief Executes one round from the belmann ford algorithm. /// /// If the algoritm calculated the distances in the previous round /// strictly for all at most k length paths then it will calculate the /// distances strictly for all at most k + 1 length paths. With k /// iteration this function calculates the at most k length paths. /// \return %True when the algorithm have not found more shorter paths. bool processNextRound() { for (int i = 0; i < (int)_process.size(); ++i) { _mask->set(_process[i], false); } std::vector nextProcess; std::vector values(_process.size()); for (int i = 0; i < (int)_process.size(); ++i) { values[i] = (*_dist)[_process[i]]; } for (int i = 0; i < (int)_process.size(); ++i) { for (OutEdgeIt it(*graph, _process[i]); it != INVALID; ++it) { Node target = graph->target(it); Value relaxed = OperationTraits::plus(values[i], (*length)[it]); if (OperationTraits::less(relaxed, (*_dist)[target])) { _pred->set(target, it); _dist->set(target, relaxed); if (!(*_mask)[target]) { _mask->set(target, true); nextProcess.push_back(target); } } } } _process.swap(nextProcess); return _process.empty(); } /// \brief Executes one weak round from the belmann ford algorithm. /// /// If the algorithm calculated the distances in the /// previous round at least for all at most k length paths then it will /// calculate the distances at least for all at most k + 1 length paths. /// This function does not make it possible to calculate strictly the /// at most k length minimal paths, this is why it is /// called just weak round. /// \return %True when the algorithm have not found more shorter paths. bool processNextWeakRound() { for (int i = 0; i < (int)_process.size(); ++i) { _mask->set(_process[i], false); } std::vector nextProcess; for (int i = 0; i < (int)_process.size(); ++i) { for (OutEdgeIt it(*graph, _process[i]); it != INVALID; ++it) { Node target = graph->target(it); Value relaxed = OperationTraits::plus((*_dist)[_process[i]], (*length)[it]); if (OperationTraits::less(relaxed, (*_dist)[target])) { _pred->set(target, it); _dist->set(target, relaxed); if (!(*_mask)[target]) { _mask->set(target, true); nextProcess.push_back(target); } } } } _process.swap(nextProcess); return _process.empty(); } /// \brief Executes the algorithm. /// /// \pre init() must be called and at least one node should be added /// with addSource() before using this function. /// /// This method runs the %BelmannFord algorithm from the root node(s) /// in order to compute the shortest path to each node. The algorithm /// computes /// - The shortest path tree. /// - The distance of each node from the root(s). void start() { int num = countNodes(*graph) - 1; for (int i = 0; i < num; ++i) { if (processNextWeakRound()) break; } } /// \brief Executes the algorithm and checks the negative cycles. /// /// \pre init() must be called and at least one node should be added /// with addSource() before using this function. If there is /// a negative cycles in the graph it gives back false. /// /// This method runs the %BelmannFord algorithm from the root node(s) /// in order to compute the shortest path to each node. The algorithm /// computes /// - The shortest path tree. /// - The distance of each node from the root(s). bool checkedStart() { int num = countNodes(*graph); for (int i = 0; i < num; ++i) { if (processNextWeakRound()) return true; } return false; } /// \brief Executes the algorithm with path length limit. /// /// \pre init() must be called and at least one node should be added /// with addSource() before using this function. /// /// This method runs the %BelmannFord algorithm from the root node(s) /// in order to compute the shortest path with at most \c length edge /// long paths to each node. The algorithm computes /// - The shortest path tree. /// - The limited distance of each node from the root(s). void limitedStart(int length) { for (int i = 0; i < length; ++i) { if (processNextRound()) break; } } /// \brief Runs %BelmannFord algorithm from node \c s. /// /// This method runs the %BelmannFord algorithm from a root node \c s /// in order to compute the shortest path to each node. The algorithm /// computes /// - The shortest path tree. /// - The distance of each node from the root. /// /// \note d.run(s) is just a shortcut of the following code. /// \code /// d.init(); /// d.addSource(s); /// d.start(); /// \endcode void run(Node s) { init(); addSource(s); start(); } /// \brief Runs %BelmannFord algorithm with limited path length /// from node \c s. /// /// This method runs the %BelmannFord algorithm from a root node \c s /// in order to compute the shortest path with at most \c len edges /// to each node. The algorithm computes /// - The shortest path tree. /// - The distance of each node from the root. /// /// \note d.run(s, len) is just a shortcut of the following code. /// \code /// d.init(); /// d.addSource(s); /// d.limitedStart(len); /// \endcode void run(Node s, int len) { init(); addSource(s); limitedStart(len); } ///@} /// \name Query Functions /// The result of the %BelmannFord algorithm can be obtained using these /// functions.\n /// Before the use of these functions, /// either run() or start() must be called. ///@{ /// \brief Copies the shortest path to \c t into \c p /// /// This function copies the shortest path to \c t into \c p. /// If it \c t is a source itself or unreachable, then it does not /// alter \c p. /// /// \return Returns \c true if a path to \c t was actually copied to \c p, /// \c false otherwise. /// \sa DirPath template bool getPath(Path &p, Node t) { if(reached(t)) { p.clear(); typename Path::Builder b(p); for(b.setStartNode(t);predEdge(t)!=INVALID;t=predNode(t)) b.pushFront(predEdge(t)); b.commit(); return true; } return false; } /// \brief The distance of a node from the root. /// /// Returns the distance of a node from the root. /// \pre \ref run() must be called before using this function. /// \warning If node \c v in unreachable from the root the return value /// of this funcion is undefined. Value dist(Node v) const { return (*_dist)[v]; } /// \brief Returns the 'previous edge' of the shortest path tree. /// /// For a node \c v it returns the 'previous edge' of the shortest path /// tree, i.e. it returns the last edge of a shortest path from the root /// to \c v. It is \ref INVALID if \c v is unreachable from the root or /// if \c v=s. The shortest path tree used here is equal to the shortest /// path tree used in \ref predNode(). /// \pre \ref run() must be called before using /// this function. Edge predEdge(Node v) const { return (*_pred)[v]; } /// \brief Returns the 'previous node' of the shortest path tree. /// /// For a node \c v it returns the 'previous node' of the shortest path /// tree, i.e. it returns the last but one node from a shortest path from /// the root to \c /v. It is INVALID if \c v is unreachable from the root /// or if \c v=s. The shortest path tree used here is equal to the /// shortest path tree used in \ref predEdge(). \pre \ref run() must be /// called before using this function. Node predNode(Node v) const { return (*_pred)[v] == INVALID ? INVALID : graph->source((*_pred)[v]); } /// \brief Returns a reference to the NodeMap of distances. /// /// Returns a reference to the NodeMap of distances. \pre \ref run() must /// be called before using this function. const DistMap &distMap() const { return *_dist;} /// \brief Returns a reference to the shortest path tree map. /// /// Returns a reference to the NodeMap of the edges of the /// shortest path tree. /// \pre \ref run() must be called before using this function. const PredMap &predMap() const { return *_pred; } /// \brief Checks if a node is reachable from the root. /// /// Returns \c true if \c v is reachable from the root. /// \pre \ref run() must be called before using this function. /// bool reached(Node v) { return (*_dist)[v] != OperationTraits::infinity(); } ///@} }; /// \brief Default traits class of BelmannFord function. /// /// Default traits class of BelmannFord function. /// \param _Graph Graph type. /// \param _LengthMap Type of length map. template struct BelmannFordWizardDefaultTraits { /// \brief The graph type the algorithm runs on. typedef _Graph Graph; /// \brief The type of the map that stores the edge lengths. /// /// The type of the map that stores the edge lengths. /// It must meet the \ref concept::ReadMap "ReadMap" concept. typedef _LengthMap LengthMap; /// \brief The value type of the length map. typedef typename _LengthMap::Value Value; /// \brief Operation traits for belmann-ford algorithm. /// /// It defines the infinity type on the given Value type /// and the used operation. /// \see BelmannFordDefaultOperationTraits typedef BelmannFordDefaultOperationTraits OperationTraits; /// \brief The type of the map that stores the last /// edges of the shortest paths. /// /// The type of the map that stores the last /// edges of the shortest paths. /// It must meet the \ref concept::WriteMap "WriteMap" concept. typedef NullMap PredMap; /// \brief Instantiates a PredMap. /// /// This function instantiates a \ref PredMap. static PredMap *createPredMap(const _Graph &) { return new PredMap(); } /// \brief The type of the map that stores the dists of the nodes. /// /// The type of the map that stores the dists of the nodes. /// It must meet the \ref concept::WriteMap "WriteMap" concept. typedef NullMap DistMap; /// \brief Instantiates a DistMap. /// /// This function instantiates a \ref DistMap. static DistMap *createDistMap(const _Graph &) { return new DistMap(); } }; /// \brief Default traits used by \ref BelmannFordWizard /// /// To make it easier to use BelmannFord algorithm /// we have created a wizard class. /// This \ref BelmannFordWizard class needs default traits, /// as well as the \ref BelmannFord class. /// The \ref BelmannFordWizardBase is a class to be the default traits of the /// \ref BelmannFordWizard class. /// \todo More named parameters are required... template class BelmannFordWizardBase : public BelmannFordWizardDefaultTraits<_Graph,_LengthMap> { typedef BelmannFordWizardDefaultTraits<_Graph,_LengthMap> Base; protected: /// Type of the nodes in the graph. typedef typename Base::Graph::Node Node; /// Pointer to the underlying graph. void *_graph; /// Pointer to the length map void *_length; ///Pointer to the map of predecessors edges. void *_pred; ///Pointer to the map of distances. void *_dist; ///Pointer to the source node. Node _source; public: /// Constructor. /// This constructor does not require parameters, therefore it initiates /// all of the attributes to default values (0, INVALID). BelmannFordWizardBase() : _graph(0), _length(0), _pred(0), _dist(0), _source(INVALID) {} /// Constructor. /// This constructor requires some parameters, /// listed in the parameters list. /// Others are initiated to 0. /// \param graph is the initial value of \ref _graph /// \param length is the initial value of \ref _length /// \param source is the initial value of \ref _source BelmannFordWizardBase(const _Graph& graph, const _LengthMap& length, Node source = INVALID) : _graph((void *)&graph), _length((void *)&length), _pred(0), _dist(0), _source(source) {} }; /// A class to make the usage of BelmannFord algorithm easier /// This class is created to make it easier to use BelmannFord algorithm. /// It uses the functions and features of the plain \ref BelmannFord, /// but it is much simpler to use it. /// /// Simplicity means that the way to change the types defined /// in the traits class is based on functions that returns the new class /// and not on templatable built-in classes. /// When using the plain \ref BelmannFord /// the new class with the modified type comes from /// the original class by using the :: /// operator. In the case of \ref BelmannFordWizard only /// a function have to be called and it will /// return the needed class. /// /// It does not have own \ref run method. When its \ref run method is called /// it initiates a plain \ref BelmannFord class, and calls the \ref /// BelmannFord::run method of it. template class BelmannFordWizard : public _Traits { typedef _Traits Base; ///The type of the underlying graph. typedef typename _Traits::Graph Graph; typedef typename Graph::Node Node; typedef typename Graph::NodeIt NodeIt; typedef typename Graph::Edge Edge; typedef typename Graph::OutEdgeIt EdgeIt; ///The type of the map that stores the edge lengths. typedef typename _Traits::LengthMap LengthMap; ///The type of the length of the edges. typedef typename LengthMap::Value Value; ///\brief The type of the map that stores the last ///edges of the shortest paths. typedef typename _Traits::PredMap PredMap; ///The type of the map that stores the dists of the nodes. typedef typename _Traits::DistMap DistMap; public: /// Constructor. BelmannFordWizard() : _Traits() {} /// \brief Constructor that requires parameters. /// /// Constructor that requires parameters. /// These parameters will be the default values for the traits class. BelmannFordWizard(const Graph& graph, const LengthMap& length, Node source = INVALID) : _Traits(graph, length, source) {} /// \brief Copy constructor BelmannFordWizard(const _Traits &b) : _Traits(b) {} ~BelmannFordWizard() {} /// \brief Runs BelmannFord algorithm from a given node. /// /// Runs BelmannFord algorithm from a given node. /// The node can be given by the \ref source function. void run() { if(Base::_source == INVALID) throw UninitializedParameter(); BelmannFord bf(*(Graph*)Base::_graph, *(LengthMap*)Base::_length); if (Base::_pred) bf.predMap(*(PredMap*)Base::_pred); if (Base::_dist) bf.distMap(*(DistMap*)Base::_dist); bf.run(Base::_source); } /// \brief Runs BelmannFord algorithm from the given node. /// /// Runs BelmannFord algorithm from the given node. /// \param source is the given source. void run(Node source) { Base::_source = source; run(); } template struct DefPredMapBase : public Base { typedef T PredMap; static PredMap *createPredMap(const Graph &) { return 0; }; DefPredMapBase(const _Traits &b) : _Traits(b) {} }; ///\brief \ref named-templ-param "Named parameter" ///function for setting PredMap type /// /// \ref named-templ-param "Named parameter" ///function for setting PredMap type /// template BelmannFordWizard > predMap(const T &t) { Base::_pred=(void *)&t; return BelmannFordWizard >(*this); } template struct DefDistMapBase : public Base { typedef T DistMap; static DistMap *createDistMap(const Graph &) { return 0; }; DefDistMapBase(const _Traits &b) : _Traits(b) {} }; ///\brief \ref named-templ-param "Named parameter" ///function for setting DistMap type /// /// \ref named-templ-param "Named parameter" ///function for setting DistMap type /// template BelmannFordWizard > distMap(const T &t) { Base::_dist=(void *)&t; return BelmannFordWizard >(*this); } template struct DefOperationTraitsBase : public Base { typedef T OperationTraits; DefOperationTraitsBase(const _Traits &b) : _Traits(b) {} }; ///\brief \ref named-templ-param "Named parameter" ///function for setting OperationTraits type /// /// \ref named-templ-param "Named parameter" ///function for setting OperationTraits type /// template BelmannFordWizard > distMap() { return BelmannFordWizard >(*this); } /// \brief Sets the source node, from which the BelmannFord algorithm runs. /// /// Sets the source node, from which the BelmannFord algorithm runs. /// \param source is the source node. BelmannFordWizard<_Traits>& source(Node source) { Base::_source = source; return *this; } }; /// \brief Function type interface for BelmannFord algorithm. /// /// \ingroup flowalgs /// Function type interface for BelmannFord algorithm. /// /// This function also has several \ref named-templ-func-param /// "named parameters", they are declared as the members of class /// \ref BelmannFordWizard. /// The following /// example shows how to use these parameters. /// \code /// belmannford(g,length,source).predMap(preds).run(); /// \endcode /// \warning Don't forget to put the \ref BelmannFordWizard::run() "run()" /// to the end of the parameter list. /// \sa BelmannFordWizard /// \sa BelmannFord template BelmannFordWizard > belmannFord(const _Graph& graph, const _LengthMap& length, typename _Graph::Node source = INVALID) { return BelmannFordWizard > (graph, length, source); } } //END OF NAMESPACE LEMON #endif