lemon-main: comparison lemon/connectivity.h

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+:b2957259973a
+/* -*- mode: C++; indent-tabs-mode: nil; -*-
+*
+* This file is a part of LEMON, a generic C++ optimization library.
+*
+* Copyright (C) 2003-2008
+* 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_TOPOLOGY_H
+#define LEMON_TOPOLOGY_H
+#include <lemon/dfs.h>
+#include <lemon/bfs.h>
+#include <lemon/core.h>
+#include <lemon/maps.h>
+#include <lemon/adaptors.h>
+#include <lemon/concepts/digraph.h>
+#include <lemon/concepts/graph.h>
+#include <lemon/concept_check.h>
+#include <stack>
+#include <functional>
+/// \ingroup connectivity
+/// \file
+/// \brief Connectivity algorithms
+///
+/// Connectivity algorithms
+namespace lemon {
+/// \ingroup connectivity
+///
+/// \brief Check whether the given undirected graph is connected.
+///
+/// Check whether the given undirected graph is connected.
+/// \param graph The undirected graph.
+/// \return %True when there is path between any two nodes in the graph.
+/// \note By definition, the empty graph is connected.
+template <typename Graph>
+bool connected(const Graph& graph) {
+checkConcept<concepts::Graph, Graph>();
+typedef typename Graph::NodeIt NodeIt;
+if (NodeIt(graph) == INVALID) return true;
+Dfs<Graph> dfs(graph);
+dfs.run(NodeIt(graph));
+for (NodeIt it(graph); it != INVALID; ++it) {
+if (!dfs.reached(it)) {
+return false;
+}
+}
+return true;
+}
+/// \ingroup connectivity
+///
+/// \brief Count the number of connected components of an undirected graph
+///
+/// Count the number of connected components of an undirected graph
+///
+/// \param graph The graph. It must be undirected.
+/// \return The number of components
+/// \note By definition, the empty graph consists
+/// of zero connected components.
+template <typename Graph>
+int countConnectedComponents(const Graph &graph) {
+checkConcept<concepts::Graph, Graph>();
+typedef typename Graph::Node Node;
+typedef typename Graph::Arc Arc;
+typedef NullMap<Node, Arc> PredMap;
+typedef NullMap<Node, int> DistMap;
+int compNum = 0;
+typename Bfs<Graph>::
+template SetPredMap<PredMap>::
+template SetDistMap<DistMap>::
+Create bfs(graph);
+PredMap predMap;
+bfs.predMap(predMap);
+DistMap distMap;
+bfs.distMap(distMap);
+bfs.init();
+for(typename Graph::NodeIt n(graph); n != INVALID; ++n) {
+if (!bfs.reached(n)) {
+bfs.addSource(n);
+bfs.start();
+++compNum;
+}
+}
+return compNum;
+}
+/// \ingroup connectivity
+///
+/// \brief Find the connected components of an undirected graph
+///
+/// Find the connected components of an undirected graph.
+///
+/// \param graph The graph. It must be undirected.
+/// \retval compMap A writable node map. The values will be set from 0 to
+/// the number of the connected components minus one. Each values of the map
+/// will be set exactly once, the values of a certain component will be
+/// set continuously.
+/// \return The number of components
+///
+template <class Graph, class NodeMap>
+int connectedComponents(const Graph &graph, NodeMap &compMap) {
+checkConcept<concepts::Graph, Graph>();
+typedef typename Graph::Node Node;
+typedef typename Graph::Arc Arc;
+checkConcept<concepts::WriteMap<Node, int>, NodeMap>();
+typedef NullMap<Node, Arc> PredMap;
+typedef NullMap<Node, int> DistMap;
+int compNum = 0;
+typename Bfs<Graph>::
+template SetPredMap<PredMap>::
+template SetDistMap<DistMap>::
+Create bfs(graph);
+PredMap predMap;
+bfs.predMap(predMap);
+DistMap distMap;
+bfs.distMap(distMap);
+bfs.init();
+for(typename Graph::NodeIt n(graph); n != INVALID; ++n) {
+if(!bfs.reached(n)) {
+bfs.addSource(n);
+while (!bfs.emptyQueue()) {
+compMap.set(bfs.nextNode(), compNum);
+bfs.processNextNode();
+}
+++compNum;
+}
+}
+return compNum;
+}
+namespace _topology_bits {
+template <typename Digraph, typename Iterator >
+struct LeaveOrderVisitor : public DfsVisitor<Digraph> {
+public:
+typedef typename Digraph::Node Node;
+LeaveOrderVisitor(Iterator it) : _it(it) {}
+void leave(const Node& node) {
+*(_it++) = node;
+}
+private:
+Iterator _it;
+};
+template <typename Digraph, typename Map>
+struct FillMapVisitor : public DfsVisitor<Digraph> {
+public:
+typedef typename Digraph::Node Node;
+typedef typename Map::Value Value;
+FillMapVisitor(Map& map, Value& value)
+: _map(map), _value(value) {}
+void reach(const Node& node) {
+_map.set(node, _value);
+}
+private:
+Map& _map;
+Value& _value;
+};
+template <typename Digraph, typename ArcMap>
+struct StronglyConnectedCutEdgesVisitor : public DfsVisitor<Digraph> {
+public:
+typedef typename Digraph::Node Node;
+typedef typename Digraph::Arc Arc;
+StronglyConnectedCutEdgesVisitor(const Digraph& digraph,
+ArcMap& cutMap,
+int& cutNum)
+: _digraph(digraph), _cutMap(cutMap), _cutNum(cutNum),
+_compMap(digraph), _num(0) {
+}
+void stop(const Node&) {
+++_num;
+}
+void reach(const Node& node) {
+_compMap.set(node, _num);
+}
+void examine(const Arc& arc) {
+if (_compMap[_digraph.source(arc)] !=
+_compMap[_digraph.target(arc)]) {
+_cutMap.set(arc, true);
+++_cutNum;
+}
+}
+private:
+const Digraph& _digraph;
+ArcMap& _cutMap;
+int& _cutNum;
+typename Digraph::template NodeMap<int> _compMap;
+int _num;
+};
+}
+/// \ingroup connectivity
+///
+/// \brief Check whether the given directed graph is strongly connected.
+///
+/// Check whether the given directed graph is strongly connected. The
+/// graph is strongly connected when any two nodes of the graph are
+/// connected with directed paths in both direction.
+/// \return %False when the graph is not strongly connected.
+/// \see connected
+///
+/// \note By definition, the empty graph is strongly connected.
+template <typename Digraph>
+bool stronglyConnected(const Digraph& digraph) {
+checkConcept<concepts::Digraph, Digraph>();
+typedef typename Digraph::Node Node;
+typedef typename Digraph::NodeIt NodeIt;
+typename Digraph::Node source = NodeIt(digraph);
+if (source == INVALID) return true;
+using namespace _topology_bits;
+typedef DfsVisitor<Digraph> Visitor;
+Visitor visitor;
+DfsVisit<Digraph, Visitor> dfs(digraph, visitor);
+dfs.init();
+dfs.addSource(source);
+dfs.start();
+for (NodeIt it(digraph); it != INVALID; ++it) {
+if (!dfs.reached(it)) {
+return false;
+}
+}
+typedef ReverseDigraph<const Digraph> RDigraph;
+RDigraph rdigraph(digraph);
+typedef DfsVisitor<Digraph> RVisitor;
+RVisitor rvisitor;
+DfsVisit<RDigraph, RVisitor> rdfs(rdigraph, rvisitor);
+rdfs.init();
+rdfs.addSource(source);
+rdfs.start();
+for (NodeIt it(rdigraph); it != INVALID; ++it) {
+if (!rdfs.reached(it)) {
+return false;
+}
+}
+return true;
+}
+/// \ingroup connectivity
+///
+/// \brief Count the strongly connected components of a directed graph
+///
+/// Count the strongly connected components of a directed graph.
+/// The strongly connected components are the classes of an
+/// equivalence relation on the nodes of the graph. Two nodes are in
+/// the same class if they are connected with directed paths in both
+/// direction.
+///
+/// \param graph The graph.
+/// \return The number of components
+/// \note By definition, the empty graph has zero
+/// strongly connected components.
+template <typename Digraph>
+int countStronglyConnectedComponents(const Digraph& digraph) {
+checkConcept<concepts::Digraph, Digraph>();
+using namespace _topology_bits;
+typedef typename Digraph::Node Node;
+typedef typename Digraph::Arc Arc;
+typedef typename Digraph::NodeIt NodeIt;
+typedef typename Digraph::ArcIt ArcIt;
+typedef std::vector<Node> Container;
+typedef typename Container::iterator Iterator;
+Container nodes(countNodes(digraph));
+typedef LeaveOrderVisitor<Digraph, Iterator> Visitor;
+Visitor visitor(nodes.begin());
+DfsVisit<Digraph, Visitor> dfs(digraph, visitor);
+dfs.init();
+for (NodeIt it(digraph); it != INVALID; ++it) {
+if (!dfs.reached(it)) {
+dfs.addSource(it);
+dfs.start();
+}
+}
+typedef typename Container::reverse_iterator RIterator;
+typedef ReverseDigraph<const Digraph> RDigraph;
+RDigraph rdigraph(digraph);
+typedef DfsVisitor<Digraph> RVisitor;
+RVisitor rvisitor;
+DfsVisit<RDigraph, RVisitor> rdfs(rdigraph, rvisitor);
+int compNum = 0;
+rdfs.init();
+for (RIterator it = nodes.rbegin(); it != nodes.rend(); ++it) {
+if (!rdfs.reached(*it)) {
+rdfs.addSource(*it);
+rdfs.start();
+++compNum;
+}
+}
+return compNum;
+}
+/// \ingroup connectivity
+///
+/// \brief Find the strongly connected components of a directed graph
+///
+/// Find the strongly connected components of a directed graph.  The
+/// strongly connected components are the classes of an equivalence
+/// relation on the nodes of the graph. Two nodes are in
+/// relationship when there are directed paths between them in both
+/// direction. In addition, the numbering of components will satisfy
+/// that there is no arc going from a higher numbered component to
+/// a lower.
+///
+/// \param digraph The digraph.
+/// \retval compMap A writable node map. The values will be set from 0 to
+/// the number of the strongly connected components minus one. Each value
+/// of the map will be set exactly once, the values of a certain component
+/// will be set continuously.
+/// \return The number of components
+///
+template <typename Digraph, typename NodeMap>
+int stronglyConnectedComponents(const Digraph& digraph, NodeMap& compMap) {
+checkConcept<concepts::Digraph, Digraph>();
+typedef typename Digraph::Node Node;
+typedef typename Digraph::NodeIt NodeIt;
+checkConcept<concepts::WriteMap<Node, int>, NodeMap>();
+using namespace _topology_bits;
+typedef std::vector<Node> Container;
+typedef typename Container::iterator Iterator;
+Container nodes(countNodes(digraph));
+typedef LeaveOrderVisitor<Digraph, Iterator> Visitor;
+Visitor visitor(nodes.begin());
+DfsVisit<Digraph, Visitor> dfs(digraph, visitor);
+dfs.init();
+for (NodeIt it(digraph); it != INVALID; ++it) {
+if (!dfs.reached(it)) {
+dfs.addSource(it);
+dfs.start();
+}
+}
+typedef typename Container::reverse_iterator RIterator;
+typedef ReverseDigraph<const Digraph> RDigraph;
+RDigraph rdigraph(digraph);
+int compNum = 0;
+typedef FillMapVisitor<RDigraph, NodeMap> RVisitor;
+RVisitor rvisitor(compMap, compNum);
+DfsVisit<RDigraph, RVisitor> rdfs(rdigraph, rvisitor);
+rdfs.init();
+for (RIterator it = nodes.rbegin(); it != nodes.rend(); ++it) {
+if (!rdfs.reached(*it)) {
+rdfs.addSource(*it);
+rdfs.start();
+++compNum;
+}
+}
+return compNum;
+}
+/// \ingroup connectivity
+///
+/// \brief Find the cut arcs of the strongly connected components.
+///
+/// Find the cut arcs of the strongly connected components.
+/// The strongly connected components are the classes of an equivalence
+/// relation on the nodes of the graph. Two nodes are in relationship
+/// when there are directed paths between them in both direction.
+/// The strongly connected components are separated by the cut arcs.
+///
+/// \param graph The graph.
+/// \retval cutMap A writable node map. The values will be set true when the
+/// arc is a cut arc.
+///
+/// \return The number of cut arcs
+template <typename Digraph, typename ArcMap>
+int stronglyConnectedCutArcs(const Digraph& graph, ArcMap& cutMap) {
+checkConcept<concepts::Digraph, Digraph>();
+typedef typename Digraph::Node Node;
+typedef typename Digraph::Arc Arc;
+typedef typename Digraph::NodeIt NodeIt;
+checkConcept<concepts::WriteMap<Arc, bool>, ArcMap>();
+using namespace _topology_bits;
+typedef std::vector<Node> Container;
+typedef typename Container::iterator Iterator;
+Container nodes(countNodes(graph));
+typedef LeaveOrderVisitor<Digraph, Iterator> Visitor;
+Visitor visitor(nodes.begin());
+DfsVisit<Digraph, Visitor> dfs(graph, visitor);
+dfs.init();
+for (NodeIt it(graph); it != INVALID; ++it) {
+if (!dfs.reached(it)) {
+dfs.addSource(it);
+dfs.start();
+}
+}
+typedef typename Container::reverse_iterator RIterator;
+typedef ReverseDigraph<const Digraph> RDigraph;
+RDigraph rgraph(graph);
+int cutNum = 0;
+typedef StronglyConnectedCutEdgesVisitor<RDigraph, ArcMap> RVisitor;
+RVisitor rvisitor(rgraph, cutMap, cutNum);
+DfsVisit<RDigraph, RVisitor> rdfs(rgraph, rvisitor);
+rdfs.init();
+for (RIterator it = nodes.rbegin(); it != nodes.rend(); ++it) {
+if (!rdfs.reached(*it)) {
+rdfs.addSource(*it);
+rdfs.start();
+}
+}
+return cutNum;
+}
+namespace _topology_bits {
+template <typename Digraph>
+class CountBiNodeConnectedComponentsVisitor : public DfsVisitor<Digraph> {
+public:
+typedef typename Digraph::Node Node;
+typedef typename Digraph::Arc Arc;
+typedef typename Digraph::Edge Edge;
+CountBiNodeConnectedComponentsVisitor(const Digraph& graph, int &compNum)
+: _graph(graph), _compNum(compNum),
+_numMap(graph), _retMap(graph), _predMap(graph), _num(0) {}
+void start(const Node& node) {
+_predMap.set(node, INVALID);
+}
+void reach(const Node& node) {
+_numMap.set(node, _num);
+_retMap.set(node, _num);
+++_num;
+}
+void discover(const Arc& edge) {
+_predMap.set(_graph.target(edge), _graph.source(edge));
+}
+void examine(const Arc& edge) {
+if (_graph.source(edge) == _graph.target(edge) &&
+_graph.direction(edge)) {
+++_compNum;
+return;
+}
+if (_predMap[_graph.source(edge)] == _graph.target(edge)) {
+return;
+}
+if (_retMap[_graph.source(edge)] > _numMap[_graph.target(edge)]) {
+_retMap.set(_graph.source(edge), _numMap[_graph.target(edge)]);
+}
+}
+void backtrack(const Arc& edge) {
+if (_retMap[_graph.source(edge)] > _retMap[_graph.target(edge)]) {
+_retMap.set(_graph.source(edge), _retMap[_graph.target(edge)]);
+}
+if (_numMap[_graph.source(edge)] <= _retMap[_graph.target(edge)]) {
+++_compNum;
+}
+}
+private:
+const Digraph& _graph;
+int& _compNum;
+typename Digraph::template NodeMap<int> _numMap;
+typename Digraph::template NodeMap<int> _retMap;
+typename Digraph::template NodeMap<Node> _predMap;
+int _num;
+};
+template <typename Digraph, typename ArcMap>
+class BiNodeConnectedComponentsVisitor : public DfsVisitor<Digraph> {
+public:
+typedef typename Digraph::Node Node;
+typedef typename Digraph::Arc Arc;
+typedef typename Digraph::Edge Edge;
+BiNodeConnectedComponentsVisitor(const Digraph& graph,
+ArcMap& compMap, int &compNum)
+: _graph(graph), _compMap(compMap), _compNum(compNum),
+_numMap(graph), _retMap(graph), _predMap(graph), _num(0) {}
+void start(const Node& node) {
+_predMap.set(node, INVALID);
+}
+void reach(const Node& node) {
+_numMap.set(node, _num);
+_retMap.set(node, _num);
+++_num;
+}
+void discover(const Arc& edge) {
+Node target = _graph.target(edge);
+_predMap.set(target, edge);
+_edgeStack.push(edge);
+}
+void examine(const Arc& edge) {
+Node source = _graph.source(edge);
+Node target = _graph.target(edge);
+if (source == target && _graph.direction(edge)) {
+_compMap.set(edge, _compNum);
+++_compNum;
+return;
+}
+if (_numMap[target] < _numMap[source]) {
+if (_predMap[source] != _graph.oppositeArc(edge)) {
+_edgeStack.push(edge);
+}
+}
+if (_predMap[source] != INVALID &&
+target == _graph.source(_predMap[source])) {
+return;
+}
+if (_retMap[source] > _numMap[target]) {
+_retMap.set(source, _numMap[target]);
+}
+}
+void backtrack(const Arc& edge) {
+Node source = _graph.source(edge);
+Node target = _graph.target(edge);
+if (_retMap[source] > _retMap[target]) {
+_retMap.set(source, _retMap[target]);
+}
+if (_numMap[source] <= _retMap[target]) {
+while (_edgeStack.top() != edge) {
+_compMap.set(_edgeStack.top(), _compNum);
+_edgeStack.pop();
+}
+_compMap.set(edge, _compNum);
+_edgeStack.pop();
+++_compNum;
+}
+}
+private:
+const Digraph& _graph;
+ArcMap& _compMap;
+int& _compNum;
+typename Digraph::template NodeMap<int> _numMap;
+typename Digraph::template NodeMap<int> _retMap;
+typename Digraph::template NodeMap<Arc> _predMap;
+std::stack<Edge> _edgeStack;
+int _num;
+};
+template <typename Digraph, typename NodeMap>
+class BiNodeConnectedCutNodesVisitor : public DfsVisitor<Digraph> {
+public:
+typedef typename Digraph::Node Node;
+typedef typename Digraph::Arc Arc;
+typedef typename Digraph::Edge Edge;
+BiNodeConnectedCutNodesVisitor(const Digraph& graph, NodeMap& cutMap,
+int& cutNum)
+: _graph(graph), _cutMap(cutMap), _cutNum(cutNum),
+_numMap(graph), _retMap(graph), _predMap(graph), _num(0) {}
+void start(const Node& node) {
+_predMap.set(node, INVALID);
+rootCut = false;
+}
+void reach(const Node& node) {
+_numMap.set(node, _num);
+_retMap.set(node, _num);
+++_num;
+}
+void discover(const Arc& edge) {
+_predMap.set(_graph.target(edge), _graph.source(edge));
+}
+void examine(const Arc& edge) {
+if (_graph.source(edge) == _graph.target(edge) &&
+_graph.direction(edge)) {
+if (!_cutMap[_graph.source(edge)]) {
+_cutMap.set(_graph.source(edge), true);
+++_cutNum;
+}
+return;
+}
+if (_predMap[_graph.source(edge)] == _graph.target(edge)) return;
+if (_retMap[_graph.source(edge)] > _numMap[_graph.target(edge)]) {
+_retMap.set(_graph.source(edge), _numMap[_graph.target(edge)]);
+}
+}
+void backtrack(const Arc& edge) {
+if (_retMap[_graph.source(edge)] > _retMap[_graph.target(edge)]) {
+_retMap.set(_graph.source(edge), _retMap[_graph.target(edge)]);
+}
+if (_numMap[_graph.source(edge)] <= _retMap[_graph.target(edge)]) {
+if (_predMap[_graph.source(edge)] != INVALID) {
+if (!_cutMap[_graph.source(edge)]) {
+_cutMap.set(_graph.source(edge), true);
+++_cutNum;
+}
+} else if (rootCut) {
+if (!_cutMap[_graph.source(edge)]) {
+_cutMap.set(_graph.source(edge), true);
+++_cutNum;
+}
+} else {
+rootCut = true;
+}
+}
+}
+private:
+const Digraph& _graph;
+NodeMap& _cutMap;
+int& _cutNum;
+typename Digraph::template NodeMap<int> _numMap;
+typename Digraph::template NodeMap<int> _retMap;
+typename Digraph::template NodeMap<Node> _predMap;
+std::stack<Edge> _edgeStack;
+int _num;
+bool rootCut;
+};
+}
+template <typename Graph>
+int countBiNodeConnectedComponents(const Graph& graph);
+/// \ingroup connectivity
+///
+/// \brief Checks the graph is bi-node-connected.
+///
+/// This function checks that the undirected graph is bi-node-connected
+/// graph. The graph is bi-node-connected if any two undirected edge is
+/// on same circle.
+///
+/// \param graph The graph.
+/// \return %True when the graph bi-node-connected.
+template <typename Graph>
+bool biNodeConnected(const Graph& graph) {
+return countBiNodeConnectedComponents(graph) <= 1;
+}
+/// \ingroup connectivity
+///
+/// \brief Count the biconnected components.
+///
+/// This function finds the bi-node-connected components in an undirected
+/// graph. The biconnected components are the classes of an equivalence
+/// relation on the undirected edges. Two undirected edge is in relationship
+/// when they are on same circle.
+///
+/// \param graph The graph.
+/// \return The number of components.
+template <typename Graph>
+int countBiNodeConnectedComponents(const Graph& graph) {
+checkConcept<concepts::Graph, Graph>();
+typedef typename Graph::NodeIt NodeIt;
+using namespace _topology_bits;
+typedef CountBiNodeConnectedComponentsVisitor<Graph> Visitor;
+int compNum = 0;
+Visitor visitor(graph, compNum);
+DfsVisit<Graph, Visitor> dfs(graph, visitor);
+dfs.init();
+for (NodeIt it(graph); it != INVALID; ++it) {
+if (!dfs.reached(it)) {
+dfs.addSource(it);
+dfs.start();
+}
+}
+return compNum;
+}
+/// \ingroup connectivity
+///
+/// \brief Find the bi-node-connected components.
+///
+/// This function finds the bi-node-connected components in an undirected
+/// graph. The bi-node-connected components are the classes of an equivalence
+/// relation on the undirected edges. Two undirected edge are in relationship
+/// when they are on same circle.
+///
+/// \param graph The graph.
+/// \retval compMap A writable uedge map. The values will be set from 0
+/// to the number of the biconnected components minus one. Each values
+/// of the map will be set exactly once, the values of a certain component
+/// will be set continuously.
+/// \return The number of components.
+///
+template <typename Graph, typename EdgeMap>
+int biNodeConnectedComponents(const Graph& graph,
+EdgeMap& compMap) {
+checkConcept<concepts::Graph, Graph>();
+typedef typename Graph::NodeIt NodeIt;
+typedef typename Graph::Edge Edge;
+checkConcept<concepts::WriteMap<Edge, int>, EdgeMap>();
+using namespace _topology_bits;
+typedef BiNodeConnectedComponentsVisitor<Graph, EdgeMap> Visitor;
+int compNum = 0;
+Visitor visitor(graph, compMap, compNum);
+DfsVisit<Graph, Visitor> dfs(graph, visitor);
+dfs.init();
+for (NodeIt it(graph); it != INVALID; ++it) {
+if (!dfs.reached(it)) {
+dfs.addSource(it);
+dfs.start();
+}
+}
+return compNum;
+}
+/// \ingroup connectivity
+///
+/// \brief Find the bi-node-connected cut nodes.
+///
+/// This function finds the bi-node-connected cut nodes in an undirected
+/// graph. The bi-node-connected components are the classes of an equivalence
+/// relation on the undirected edges. Two undirected edges are in
+/// relationship when they are on same circle. The biconnected components
+/// are separted by nodes which are the cut nodes of the components.
+///
+/// \param graph The graph.
+/// \retval cutMap A writable edge map. The values will be set true when
+/// the node separate two or more components.
+/// \return The number of the cut nodes.
+template <typename Graph, typename NodeMap>
+int biNodeConnectedCutNodes(const Graph& graph, NodeMap& cutMap) {
+checkConcept<concepts::Graph, Graph>();
+typedef typename Graph::Node Node;
+typedef typename Graph::NodeIt NodeIt;
+checkConcept<concepts::WriteMap<Node, bool>, NodeMap>();
+using namespace _topology_bits;
+typedef BiNodeConnectedCutNodesVisitor<Graph, NodeMap> Visitor;
+int cutNum = 0;
+Visitor visitor(graph, cutMap, cutNum);
+DfsVisit<Graph, Visitor> dfs(graph, visitor);
+dfs.init();
+for (NodeIt it(graph); it != INVALID; ++it) {
+if (!dfs.reached(it)) {
+dfs.addSource(it);
+dfs.start();
+}
+}
+return cutNum;
+}
+namespace _topology_bits {
+template <typename Digraph>
+class CountBiEdgeConnectedComponentsVisitor : public DfsVisitor<Digraph> {
+public:
+typedef typename Digraph::Node Node;
+typedef typename Digraph::Arc Arc;
+typedef typename Digraph::Edge Edge;
+CountBiEdgeConnectedComponentsVisitor(const Digraph& graph, int &compNum)
+: _graph(graph), _compNum(compNum),
+_numMap(graph), _retMap(graph), _predMap(graph), _num(0) {}
+void start(const Node& node) {
+_predMap.set(node, INVALID);
+}
+void reach(const Node& node) {
+_numMap.set(node, _num);
+_retMap.set(node, _num);
+++_num;
+}
+void leave(const Node& node) {
+if (_numMap[node] <= _retMap[node]) {
+++_compNum;
+}
+}
+void discover(const Arc& edge) {
+_predMap.set(_graph.target(edge), edge);
+}
+void examine(const Arc& edge) {
+if (_predMap[_graph.source(edge)] == _graph.oppositeArc(edge)) {
+return;
+}
+if (_retMap[_graph.source(edge)] > _retMap[_graph.target(edge)]) {
+_retMap.set(_graph.source(edge), _retMap[_graph.target(edge)]);
+}
+}
+void backtrack(const Arc& edge) {
+if (_retMap[_graph.source(edge)] > _retMap[_graph.target(edge)]) {
+_retMap.set(_graph.source(edge), _retMap[_graph.target(edge)]);
+}
+}
+private:
+const Digraph& _graph;
+int& _compNum;
+typename Digraph::template NodeMap<int> _numMap;
+typename Digraph::template NodeMap<int> _retMap;
+typename Digraph::template NodeMap<Arc> _predMap;
+int _num;
+};
+template <typename Digraph, typename NodeMap>
+class BiEdgeConnectedComponentsVisitor : public DfsVisitor<Digraph> {
+public:
+typedef typename Digraph::Node Node;
+typedef typename Digraph::Arc Arc;
+typedef typename Digraph::Edge Edge;
+BiEdgeConnectedComponentsVisitor(const Digraph& graph,
+NodeMap& compMap, int &compNum)
+: _graph(graph), _compMap(compMap), _compNum(compNum),
+_numMap(graph), _retMap(graph), _predMap(graph), _num(0) {}
+void start(const Node& node) {
+_predMap.set(node, INVALID);
+}
+void reach(const Node& node) {
+_numMap.set(node, _num);
+_retMap.set(node, _num);
+_nodeStack.push(node);
+++_num;
+}
+void leave(const Node& node) {
+if (_numMap[node] <= _retMap[node]) {
+while (_nodeStack.top() != node) {
+_compMap.set(_nodeStack.top(), _compNum);
+_nodeStack.pop();
+}
+_compMap.set(node, _compNum);
+_nodeStack.pop();
+++_compNum;
+}
+}
+void discover(const Arc& edge) {
+_predMap.set(_graph.target(edge), edge);
+}
+void examine(const Arc& edge) {
+if (_predMap[_graph.source(edge)] == _graph.oppositeArc(edge)) {
+return;
+}
+if (_retMap[_graph.source(edge)] > _retMap[_graph.target(edge)]) {
+_retMap.set(_graph.source(edge), _retMap[_graph.target(edge)]);
+}
+}
+void backtrack(const Arc& edge) {
+if (_retMap[_graph.source(edge)] > _retMap[_graph.target(edge)]) {
+_retMap.set(_graph.source(edge), _retMap[_graph.target(edge)]);
+}
+}
+private:
+const Digraph& _graph;
+NodeMap& _compMap;
+int& _compNum;
+typename Digraph::template NodeMap<int> _numMap;
+typename Digraph::template NodeMap<int> _retMap;
+typename Digraph::template NodeMap<Arc> _predMap;
+std::stack<Node> _nodeStack;
+int _num;
+};
+template <typename Digraph, typename ArcMap>
+class BiEdgeConnectedCutEdgesVisitor : public DfsVisitor<Digraph> {
+public:
+typedef typename Digraph::Node Node;
+typedef typename Digraph::Arc Arc;
+typedef typename Digraph::Edge Edge;
+BiEdgeConnectedCutEdgesVisitor(const Digraph& graph,
+ArcMap& cutMap, int &cutNum)
+: _graph(graph), _cutMap(cutMap), _cutNum(cutNum),
+_numMap(graph), _retMap(graph), _predMap(graph), _num(0) {}
+void start(const Node& node) {
+_predMap[node] = INVALID;
+}
+void reach(const Node& node) {
+_numMap.set(node, _num);
+_retMap.set(node, _num);
+++_num;
+}
+void leave(const Node& node) {
+if (_numMap[node] <= _retMap[node]) {
+if (_predMap[node] != INVALID) {
+_cutMap.set(_predMap[node], true);
+++_cutNum;
+}
+}
+}
+void discover(const Arc& edge) {
+_predMap.set(_graph.target(edge), edge);
+}
+void examine(const Arc& edge) {
+if (_predMap[_graph.source(edge)] == _graph.oppositeArc(edge)) {
+return;
+}
+if (_retMap[_graph.source(edge)] > _retMap[_graph.target(edge)]) {
+_retMap.set(_graph.source(edge), _retMap[_graph.target(edge)]);
+}
+}
+void backtrack(const Arc& edge) {
+if (_retMap[_graph.source(edge)] > _retMap[_graph.target(edge)]) {
+_retMap.set(_graph.source(edge), _retMap[_graph.target(edge)]);
+}
+}
+private:
+const Digraph& _graph;
+ArcMap& _cutMap;
+int& _cutNum;
+typename Digraph::template NodeMap<int> _numMap;
+typename Digraph::template NodeMap<int> _retMap;
+typename Digraph::template NodeMap<Arc> _predMap;
+int _num;
+};
+}
+template <typename Graph>
+int countBiEdgeConnectedComponents(const Graph& graph);
+/// \ingroup connectivity
+///
+/// \brief Checks that the graph is bi-edge-connected.
+///
+/// This function checks that the graph is bi-edge-connected. The undirected
+/// graph is bi-edge-connected when any two nodes are connected with two
+/// edge-disjoint paths.
+///
+/// \param graph The undirected graph.
+/// \return The number of components.
+template <typename Graph>
+bool biEdgeConnected(const Graph& graph) {
+return countBiEdgeConnectedComponents(graph) <= 1;
+}
+/// \ingroup connectivity
+///
+/// \brief Count the bi-edge-connected components.
+///
+/// This function count the bi-edge-connected components in an undirected
+/// graph. The bi-edge-connected components are the classes of an equivalence
+/// relation on the nodes. Two nodes are in relationship when they are
+/// connected with at least two edge-disjoint paths.
+///
+/// \param graph The undirected graph.
+/// \return The number of components.
+template <typename Graph>
+int countBiEdgeConnectedComponents(const Graph& graph) {
+checkConcept<concepts::Graph, Graph>();
+typedef typename Graph::NodeIt NodeIt;
+using namespace _topology_bits;
+typedef CountBiEdgeConnectedComponentsVisitor<Graph> Visitor;
+int compNum = 0;
+Visitor visitor(graph, compNum);
+DfsVisit<Graph, Visitor> dfs(graph, visitor);
+dfs.init();
+for (NodeIt it(graph); it != INVALID; ++it) {
+if (!dfs.reached(it)) {
+dfs.addSource(it);
+dfs.start();
+}
+}
+return compNum;
+}
+/// \ingroup connectivity
+///
+/// \brief Find the bi-edge-connected components.
+///
+/// This function finds the bi-edge-connected components in an undirected
+/// graph. The bi-edge-connected components are the classes of an equivalence
+/// relation on the nodes. Two nodes are in relationship when they are
+/// connected at least two edge-disjoint paths.
+///
+/// \param graph The graph.
+/// \retval compMap A writable node map. The values will be set from 0 to
+/// the number of the biconnected components minus one. Each values
+/// of the map will be set exactly once, the values of a certain component
+/// will be set continuously.
+/// \return The number of components.
+///
+template <typename Graph, typename NodeMap>
+int biEdgeConnectedComponents(const Graph& graph, NodeMap& compMap) {
+checkConcept<concepts::Graph, Graph>();
+typedef typename Graph::NodeIt NodeIt;
+typedef typename Graph::Node Node;
+checkConcept<concepts::WriteMap<Node, int>, NodeMap>();
+using namespace _topology_bits;
+typedef BiEdgeConnectedComponentsVisitor<Graph, NodeMap> Visitor;
+int compNum = 0;
+Visitor visitor(graph, compMap, compNum);
+DfsVisit<Graph, Visitor> dfs(graph, visitor);
+dfs.init();
+for (NodeIt it(graph); it != INVALID; ++it) {
+if (!dfs.reached(it)) {
+dfs.addSource(it);
+dfs.start();
+}
+}
+return compNum;
+}
+/// \ingroup connectivity
+///
+/// \brief Find the bi-edge-connected cut edges.
+///
+/// This function finds the bi-edge-connected components in an undirected
+/// graph. The bi-edge-connected components are the classes of an equivalence
+/// relation on the nodes. Two nodes are in relationship when they are
+/// connected with at least two edge-disjoint paths. The bi-edge-connected
+/// components are separted by edges which are the cut edges of the
+/// components.
+///
+/// \param graph The graph.
+/// \retval cutMap A writable node map. The values will be set true when the
+/// edge is a cut edge.
+/// \return The number of cut edges.
+template <typename Graph, typename EdgeMap>
+int biEdgeConnectedCutEdges(const Graph& graph, EdgeMap& cutMap) {
+checkConcept<concepts::Graph, Graph>();
+typedef typename Graph::NodeIt NodeIt;
+typedef typename Graph::Edge Edge;
+checkConcept<concepts::WriteMap<Edge, bool>, EdgeMap>();
+using namespace _topology_bits;
+typedef BiEdgeConnectedCutEdgesVisitor<Graph, EdgeMap> Visitor;
+int cutNum = 0;
+Visitor visitor(graph, cutMap, cutNum);
+DfsVisit<Graph, Visitor> dfs(graph, visitor);
+dfs.init();
+for (NodeIt it(graph); it != INVALID; ++it) {
+if (!dfs.reached(it)) {
+dfs.addSource(it);
+dfs.start();
+}
+}
+return cutNum;
+}
+namespace _topology_bits {
+template <typename Digraph, typename IntNodeMap>
+class TopologicalSortVisitor : public DfsVisitor<Digraph> {
+public:
+typedef typename Digraph::Node Node;
+typedef typename Digraph::Arc edge;
+TopologicalSortVisitor(IntNodeMap& order, int num)
+: _order(order), _num(num) {}
+void leave(const Node& node) {
+_order.set(node, --_num);
+}
+private:
+IntNodeMap& _order;
+int _num;
+};
+}
+/// \ingroup connectivity
+///
+/// \brief Sort the nodes of a DAG into topolgical order.
+///
+/// Sort the nodes of a DAG into topolgical order.
+///
+/// \param graph The graph. It must be directed and acyclic.
+/// \retval order A writable node map. The values will be set from 0 to
+/// the number of the nodes in the graph minus one. Each values of the map
+/// will be set exactly once, the values  will be set descending order.
+///
+/// \see checkedTopologicalSort
+/// \see dag
+template <typename Digraph, typename NodeMap>
+void topologicalSort(const Digraph& graph, NodeMap& order) {
+using namespace _topology_bits;
+checkConcept<concepts::Digraph, Digraph>();
+checkConcept<concepts::WriteMap<typename Digraph::Node, int>, NodeMap>();
+typedef typename Digraph::Node Node;
+typedef typename Digraph::NodeIt NodeIt;
+typedef typename Digraph::Arc Arc;
+TopologicalSortVisitor<Digraph, NodeMap>
+visitor(order, countNodes(graph));
+DfsVisit<Digraph, TopologicalSortVisitor<Digraph, NodeMap> >
+dfs(graph, visitor);
+dfs.init();
+for (NodeIt it(graph); it != INVALID; ++it) {
+if (!dfs.reached(it)) {
+dfs.addSource(it);
+dfs.start();
+}
+}
+}
+/// \ingroup connectivity
+///
+/// \brief Sort the nodes of a DAG into topolgical order.
+///
+/// Sort the nodes of a DAG into topolgical order. It also checks
+/// that the given graph is DAG.
+///
+/// \param graph The graph. It must be directed and acyclic.
+/// \retval order A readable - writable node map. The values will be set
+/// from 0 to the number of the nodes in the graph minus one. Each values
+/// of the map will be set exactly once, the values will be set descending
+/// order.
+/// \return %False when the graph is not DAG.
+///
+/// \see topologicalSort
+/// \see dag
+template <typename Digraph, typename NodeMap>
+bool checkedTopologicalSort(const Digraph& graph, NodeMap& order) {
+using namespace _topology_bits;
+checkConcept<concepts::Digraph, Digraph>();
+checkConcept<concepts::ReadWriteMap<typename Digraph::Node, int>,
+NodeMap>();
+typedef typename Digraph::Node Node;
+typedef typename Digraph::NodeIt NodeIt;
+typedef typename Digraph::Arc Arc;
+order = constMap<Node, int, -1>();
+TopologicalSortVisitor<Digraph, NodeMap>
+visitor(order, countNodes(graph));
+DfsVisit<Digraph, TopologicalSortVisitor<Digraph, NodeMap> >
+dfs(graph, visitor);
+dfs.init();
+for (NodeIt it(graph); it != INVALID; ++it) {
+if (!dfs.reached(it)) {
+dfs.addSource(it);
+while (!dfs.emptyQueue()) {
+Arc edge = dfs.nextArc();
+Node target = graph.target(edge);
+if (dfs.reached(target) && order[target] == -1) {
+return false;
+}
+dfs.processNextArc();
+}
+}
+}
+return true;
+}
+/// \ingroup connectivity
+///
+/// \brief Check that the given directed graph is a DAG.
+///
+/// Check that the given directed graph is a DAG. The DAG is
+/// an Directed Acyclic Digraph.
+/// \return %False when the graph is not DAG.
+/// \see acyclic
+template <typename Digraph>
+bool dag(const Digraph& graph) {
+checkConcept<concepts::Digraph, Digraph>();
+typedef typename Digraph::Node Node;
+typedef typename Digraph::NodeIt NodeIt;
+typedef typename Digraph::Arc Arc;
+typedef typename Digraph::template NodeMap<bool> ProcessedMap;
+typename Dfs<Digraph>::template SetProcessedMap<ProcessedMap>::
+Create dfs(graph);
+ProcessedMap processed(graph);
+dfs.processedMap(processed);
+dfs.init();
+for (NodeIt it(graph); it != INVALID; ++it) {
+if (!dfs.reached(it)) {
+dfs.addSource(it);
+while (!dfs.emptyQueue()) {
+Arc edge = dfs.nextArc();
+Node target = graph.target(edge);
+if (dfs.reached(target) && !processed[target]) {
+return false;
+}
+dfs.processNextArc();
+}
+}
+}
+return true;
+}
+/// \ingroup connectivity
+///
+/// \brief Check that the given undirected graph is acyclic.
+///
+/// Check that the given undirected graph acyclic.
+/// \param graph The undirected graph.
+/// \return %True when there is no circle in the graph.
+/// \see dag
+template <typename Graph>
+bool acyclic(const Graph& graph) {
+checkConcept<concepts::Graph, Graph>();
+typedef typename Graph::Node Node;
+typedef typename Graph::NodeIt NodeIt;
+typedef typename Graph::Arc Arc;
+Dfs<Graph> dfs(graph);
+dfs.init();
+for (NodeIt it(graph); it != INVALID; ++it) {
+if (!dfs.reached(it)) {
+dfs.addSource(it);
+while (!dfs.emptyQueue()) {
+Arc edge = dfs.nextArc();
+Node source = graph.source(edge);
+Node target = graph.target(edge);
+if (dfs.reached(target) &&
+dfs.predArc(source) != graph.oppositeArc(edge)) {
+return false;
+}
+dfs.processNextArc();
+}
+}
+}
+return true;
+}
+/// \ingroup connectivity
+///
+/// \brief Check that the given undirected graph is tree.
+///
+/// Check that the given undirected graph is tree.
+/// \param graph The undirected graph.
+/// \return %True when the graph is acyclic and connected.
+template <typename Graph>
+bool tree(const Graph& graph) {
+checkConcept<concepts::Graph, Graph>();
+typedef typename Graph::Node Node;
+typedef typename Graph::NodeIt NodeIt;
+typedef typename Graph::Arc Arc;
+Dfs<Graph> dfs(graph);
+dfs.init();
+dfs.addSource(NodeIt(graph));
+while (!dfs.emptyQueue()) {
+Arc edge = dfs.nextArc();
+Node source = graph.source(edge);
+Node target = graph.target(edge);
+if (dfs.reached(target) &&
+dfs.predArc(source) != graph.oppositeArc(edge)) {
+return false;
+}
+dfs.processNextArc();
+}
+for (NodeIt it(graph); it != INVALID; ++it) {
+if (!dfs.reached(it)) {
+return false;
+}
+}
+return true;
+}
+namespace _topology_bits {
+template <typename Digraph>
+class BipartiteVisitor : public BfsVisitor<Digraph> {
+public:
+typedef typename Digraph::Arc Arc;
+typedef typename Digraph::Node Node;
+BipartiteVisitor(const Digraph& graph, bool& bipartite)
+: _graph(graph), _part(graph), _bipartite(bipartite) {}
+void start(const Node& node) {
+_part[node] = true;
+}
+void discover(const Arc& edge) {
+_part.set(_graph.target(edge), !_part[_graph.source(edge)]);
+}
+void examine(const Arc& edge) {
+_bipartite = _bipartite &&
+_part[_graph.target(edge)] != _part[_graph.source(edge)];
+}
+private:
+const Digraph& _graph;
+typename Digraph::template NodeMap<bool> _part;
+bool& _bipartite;
+};
+template <typename Digraph, typename PartMap>
+class BipartitePartitionsVisitor : public BfsVisitor<Digraph> {
+public:
+typedef typename Digraph::Arc Arc;
+typedef typename Digraph::Node Node;
+BipartitePartitionsVisitor(const Digraph& graph,
+PartMap& part, bool& bipartite)
+: _graph(graph), _part(part), _bipartite(bipartite) {}
+void start(const Node& node) {
+_part.set(node, true);
+}
+void discover(const Arc& edge) {
+_part.set(_graph.target(edge), !_part[_graph.source(edge)]);
+}
+void examine(const Arc& edge) {
+_bipartite = _bipartite &&
+_part[_graph.target(edge)] != _part[_graph.source(edge)];
+}
+private:
+const Digraph& _graph;
+PartMap& _part;
+bool& _bipartite;
+};
+}
+/// \ingroup connectivity
+///
+/// \brief Check if the given undirected graph is bipartite or not
+///
+/// The function checks if the given undirected \c graph graph is bipartite
+/// or not. The \ref Bfs algorithm is used to calculate the result.
+/// \param graph The undirected graph.
+/// \return %True if \c graph is bipartite, %false otherwise.
+/// \sa bipartitePartitions
+template<typename Graph>
+inline bool bipartite(const Graph &graph){
+using namespace _topology_bits;
+checkConcept<concepts::Graph, Graph>();
+typedef typename Graph::NodeIt NodeIt;
+typedef typename Graph::ArcIt ArcIt;
+bool bipartite = true;
+BipartiteVisitor<Graph>
+visitor(graph, bipartite);
+BfsVisit<Graph, BipartiteVisitor<Graph> >
+bfs(graph, visitor);
+bfs.init();
+for(NodeIt it(graph); it != INVALID; ++it) {
+if(!bfs.reached(it)){
+bfs.addSource(it);
+while (!bfs.emptyQueue()) {
+bfs.processNextNode();
+if (!bipartite) return false;
+}
+}
+}
+return true;
+}
+/// \ingroup connectivity
+///
+/// \brief Check if the given undirected graph is bipartite or not
+///
+/// The function checks if the given undirected graph is bipartite
+/// or not. The  \ref  Bfs  algorithm  is   used  to  calculate the result.
+/// During the execution, the \c partMap will be set as the two
+/// partitions of the graph.
+/// \param graph The undirected graph.
+/// \retval partMap A writable bool map of nodes. It will be set as the
+/// two partitions of the graph.
+/// \return %True if \c graph is bipartite, %false otherwise.
+template<typename Graph, typename NodeMap>
+inline bool bipartitePartitions(const Graph &graph, NodeMap &partMap){
+using namespace _topology_bits;
+checkConcept<concepts::Graph, Graph>();
+typedef typename Graph::Node Node;
+typedef typename Graph::NodeIt NodeIt;
+typedef typename Graph::ArcIt ArcIt;
+bool bipartite = true;
+BipartitePartitionsVisitor<Graph, NodeMap>
+visitor(graph, partMap, bipartite);
+BfsVisit<Graph, BipartitePartitionsVisitor<Graph, NodeMap> >
+bfs(graph, visitor);
+bfs.init();
+for(NodeIt it(graph); it != INVALID; ++it) {
+if(!bfs.reached(it)){
+bfs.addSource(it);
+while (!bfs.emptyQueue()) {
+bfs.processNextNode();
+if (!bipartite) return false;
+}
+}
+}
+return true;
+}
+/// \brief Returns true when there are not loop edges in the graph.
+///
+/// Returns true when there are not loop edges in the graph.
+template <typename Digraph>
+bool loopFree(const Digraph& graph) {
+for (typename Digraph::ArcIt it(graph); it != INVALID; ++it) {
+if (graph.source(it) == graph.target(it)) return false;
+}
+return true;
+}
+/// \brief Returns true when there are not parallel edges in the graph.
+///
+/// Returns true when there are not parallel edges in the graph.
+template <typename Digraph>
+bool parallelFree(const Digraph& graph) {
+typename Digraph::template NodeMap<bool> reached(graph, false);
+for (typename Digraph::NodeIt n(graph); n != INVALID; ++n) {
+for (typename Digraph::OutArcIt e(graph, n); e != INVALID; ++e) {
+if (reached[graph.target(e)]) return false;
+reached.set(graph.target(e), true);
+}
+for (typename Digraph::OutArcIt e(graph, n); e != INVALID; ++e) {
+reached.set(graph.target(e), false);
+}
+}
+return true;
+}
+/// \brief Returns true when there are not loop edges and parallel
+/// edges in the graph.
+///
+/// Returns true when there are not loop edges and parallel edges in
+/// the graph.
+template <typename Digraph>
+bool simpleDigraph(const Digraph& graph) {
+typename Digraph::template NodeMap<bool> reached(graph, false);
+for (typename Digraph::NodeIt n(graph); n != INVALID; ++n) {
+reached.set(n, true);
+for (typename Digraph::OutArcIt e(graph, n); e != INVALID; ++e) {
+if (reached[graph.target(e)]) return false;
+reached.set(graph.target(e), true);
+}
+for (typename Digraph::OutArcIt e(graph, n); e != INVALID; ++e) {
+reached.set(graph.target(e), false);
+}
+reached.set(n, false);
+}
+return true;
+}
+} //namespace lemon
+#endif //LEMON_TOPOLOGY_H

changeset 417	6ff53afe98b5
child 419	9afe81e4c543