lemon: lemon/matching.h@07ec2b52e53d (annotated)

deba@338	1	/* -- mode: C++; indent-tabs-mode: nil; --
deba@338	2	*
deba@338	3	* This file is a part of LEMON, a generic C++ optimization library.
deba@338	4	*
alpar@463	5	* Copyright (C) 2003-2009
deba@338	6	* Egervary Jeno Kombinatorikus Optimalizalasi Kutatocsoport
deba@338	7	* (Egervary Research Group on Combinatorial Optimization, EGRES).
deba@338	8	*
deba@338	9	* Permission to use, modify and distribute this software is granted
deba@338	10	* provided that this copyright notice appears in all copies. For
deba@338	11	* precise terms see the accompanying LICENSE file.
deba@338	12	*
deba@338	13	* This software is provided "AS IS" with no warranty of any kind,
deba@338	14	* express or implied, and with no claim as to its suitability for any
deba@338	15	* purpose.
deba@338	16	*
deba@338	17	*/
deba@338	18
deba@947	19	#ifndef LEMON_MATCHING_H
deba@947	20	#define LEMON_MATCHING_H
deba@338	21
deba@338	22	#include <vector>
deba@338	23	#include <queue>
deba@338	24	#include <set>
deba@338	25	#include <limits>
deba@338	26
deba@338	27	#include <lemon/core.h>
deba@338	28	#include <lemon/unionfind.h>
deba@338	29	#include <lemon/bin_heap.h>
deba@338	30	#include <lemon/maps.h>
deba@949	31	#include <lemon/fractional_matching.h>
deba@338	32
deba@338	33	///\ingroup matching
deba@338	34	///\file
deba@339	35	///\brief Maximum matching algorithms in general graphs.
deba@338	36
deba@338	37	namespace lemon {
deba@338	38
deba@339	39	/// \ingroup matching
deba@338	40	///
kpeter@637	41	/// \brief Maximum cardinality matching in general graphs
deba@338	42	///
kpeter@637	43	/// This class implements Edmonds' alternating forest matching algorithm
kpeter@640	44	/// for finding a maximum cardinality matching in a general undirected graph.
deba@947	45	/// It can be started from an arbitrary initial matching
kpeter@637	46	/// (the default is the empty one).
deba@338	47	///
alpar@342	48	/// The dual solution of the problem is a map of the nodes to
kpeter@637	49	/// \ref MaxMatching::Status "Status", having values \c EVEN (or \c D),
kpeter@637	50	/// \c ODD (or \c A) and \c MATCHED (or \c C) defining the Gallai-Edmonds
kpeter@637	51	/// decomposition of the graph. The nodes in \c EVEN/D induce a subgraph
kpeter@637	52	/// with factor-critical components, the nodes in \c ODD/A form the
kpeter@637	53	/// canonical barrier, and the nodes in \c MATCHED/C induce a graph having
kpeter@637	54	/// a perfect matching. The number of the factor-critical components
deba@339	55	/// minus the number of barrier nodes is a lower bound on the
alpar@342	56	/// unmatched nodes, and the matching is optimal if and only if this bound is
kpeter@640	57	/// tight. This decomposition can be obtained using \ref status() or
kpeter@640	58	/// \ref statusMap() after running the algorithm.
deba@338	59	///
kpeter@640	60	/// \tparam GR The undirected graph type the algorithm runs on.
kpeter@606	61	template <typename GR>
deba@338	62	class MaxMatching {
deba@339	63	public:
deba@339	64
kpeter@637	65	/// The graph type of the algorithm
kpeter@606	66	typedef GR Graph;
kpeter@640	67	/// The type of the matching map
deba@339	68	typedef typename Graph::template NodeMap<typename Graph::Arc>
deba@339	69	MatchingMap;
deba@339	70
kpeter@637	71	///\brief Status constants for Gallai-Edmonds decomposition.
deba@339	72	///
deba@947	73	///These constants are used for indicating the Gallai-Edmonds
kpeter@637	74	///decomposition of a graph. The nodes with status \c EVEN (or \c D)
kpeter@637	75	///induce a subgraph with factor-critical components, the nodes with
kpeter@637	76	///status \c ODD (or \c A) form the canonical barrier, and the nodes
deba@947	77	///with status \c MATCHED (or \c C) induce a subgraph having a
kpeter@637	78	///perfect matching.
deba@339	79	enum Status {
kpeter@637	80	EVEN = 1, ///< = 1. (\c D is an alias for \c EVEN.)
kpeter@637	81	D = 1,
kpeter@637	82	MATCHED = 0, ///< = 0. (\c C is an alias for \c MATCHED.)
kpeter@637	83	C = 0,
kpeter@637	84	ODD = -1, ///< = -1. (\c A is an alias for \c ODD.)
kpeter@637	85	A = -1,
kpeter@637	86	UNMATCHED = -2 ///< = -2.
deba@339	87	};
deba@339	88
kpeter@640	89	/// The type of the status map
deba@339	90	typedef typename Graph::template NodeMap<Status> StatusMap;
deba@339	91
deba@339	92	private:
deba@338	93
deba@338	94	TEMPLATE_GRAPH_TYPEDEFS(Graph);
deba@338	95
deba@339	96	typedef UnionFindEnum<IntNodeMap> BlossomSet;
deba@339	97	typedef ExtendFindEnum<IntNodeMap> TreeSet;
deba@339	98	typedef RangeMap<Node> NodeIntMap;
deba@339	99	typedef MatchingMap EarMap;
deba@339	100	typedef std::vector<Node> NodeQueue;
deba@339	101
deba@339	102	const Graph& _graph;
deba@339	103	MatchingMap* _matching;
deba@339	104	StatusMap* _status;
deba@339	105
deba@339	106	EarMap* _ear;
deba@339	107
deba@339	108	IntNodeMap* _blossom_set_index;
deba@339	109	BlossomSet* _blossom_set;
deba@339	110	NodeIntMap* _blossom_rep;
deba@339	111
deba@339	112	IntNodeMap* _tree_set_index;
deba@339	113	TreeSet* _tree_set;
deba@339	114
deba@339	115	NodeQueue _node_queue;
deba@339	116	int _process, _postpone, _last;
deba@339	117
deba@339	118	int _node_num;
deba@339	119
deba@339	120	private:
deba@339	121
deba@339	122	void createStructures() {
deba@339	123	_node_num = countNodes(_graph);
deba@339	124	if (!_matching) {
deba@339	125	_matching = new MatchingMap(_graph);
deba@339	126	}
deba@339	127	if (!_status) {
deba@339	128	_status = new StatusMap(_graph);
deba@339	129	}
deba@339	130	if (!_ear) {
deba@339	131	_ear = new EarMap(_graph);
deba@339	132	}
deba@339	133	if (!_blossom_set) {
deba@339	134	_blossom_set_index = new IntNodeMap(_graph);
deba@339	135	_blossom_set = new BlossomSet(*_blossom_set_index);
deba@339	136	}
deba@339	137	if (!_blossom_rep) {
deba@339	138	_blossom_rep = new NodeIntMap(_node_num);
deba@339	139	}
deba@339	140	if (!_tree_set) {
deba@339	141	_tree_set_index = new IntNodeMap(_graph);
deba@339	142	_tree_set = new TreeSet(*_tree_set_index);
deba@339	143	}
deba@339	144	_node_queue.resize(_node_num);
deba@339	145	}
deba@339	146
deba@339	147	void destroyStructures() {
deba@339	148	if (_matching) {
deba@339	149	delete _matching;
deba@339	150	}
deba@339	151	if (_status) {
deba@339	152	delete _status;
deba@339	153	}
deba@339	154	if (_ear) {
deba@339	155	delete _ear;
deba@339	156	}
deba@339	157	if (_blossom_set) {
deba@339	158	delete _blossom_set;
deba@339	159	delete _blossom_set_index;
deba@339	160	}
deba@339	161	if (_blossom_rep) {
deba@339	162	delete _blossom_rep;
deba@339	163	}
deba@339	164	if (_tree_set) {
deba@339	165	delete _tree_set_index;
deba@339	166	delete _tree_set;
deba@339	167	}
deba@339	168	}
deba@339	169
deba@339	170	void processDense(const Node& n) {
deba@339	171	_process = _postpone = _last = 0;
deba@339	172	_node_queue[_last++] = n;
deba@339	173
deba@339	174	while (_process != _last) {
deba@339	175	Node u = _node_queue[_process++];
deba@339	176	for (OutArcIt a(_graph, u); a != INVALID; ++a) {
deba@339	177	Node v = _graph.target(a);
deba@339	178	if ((*_status)[v] == MATCHED) {
deba@339	179	extendOnArc(a);
deba@339	180	} else if ((*_status)[v] == UNMATCHED) {
deba@339	181	augmentOnArc(a);
deba@339	182	return;
deba@339	183	}
deba@339	184	}
deba@339	185	}
deba@339	186
deba@339	187	while (_postpone != _last) {
deba@339	188	Node u = _node_queue[_postpone++];
deba@339	189
deba@339	190	for (OutArcIt a(_graph, u); a != INVALID ; ++a) {
deba@339	191	Node v = _graph.target(a);
deba@339	192
deba@339	193	if ((*_status)[v] == EVEN) {
deba@339	194	if (_blossom_set->find(u) != _blossom_set->find(v)) {
deba@339	195	shrinkOnEdge(a);
deba@339	196	}
deba@339	197	}
deba@339	198
deba@339	199	while (_process != _last) {
deba@339	200	Node w = _node_queue[_process++];
deba@339	201	for (OutArcIt b(_graph, w); b != INVALID; ++b) {
deba@339	202	Node x = _graph.target(b);
deba@339	203	if ((*_status)[x] == MATCHED) {
deba@339	204	extendOnArc(b);
deba@339	205	} else if ((*_status)[x] == UNMATCHED) {
deba@339	206	augmentOnArc(b);
deba@339	207	return;
deba@339	208	}
deba@339	209	}
deba@339	210	}
deba@339	211	}
deba@339	212	}
deba@339	213	}
deba@339	214
deba@339	215	void processSparse(const Node& n) {
deba@339	216	_process = _last = 0;
deba@339	217	_node_queue[_last++] = n;
deba@339	218	while (_process != _last) {
deba@339	219	Node u = _node_queue[_process++];
deba@339	220	for (OutArcIt a(_graph, u); a != INVALID; ++a) {
deba@339	221	Node v = _graph.target(a);
deba@339	222
deba@339	223	if ((*_status)[v] == EVEN) {
deba@339	224	if (_blossom_set->find(u) != _blossom_set->find(v)) {
deba@339	225	shrinkOnEdge(a);
deba@339	226	}
deba@339	227	} else if ((*_status)[v] == MATCHED) {
deba@339	228	extendOnArc(a);
deba@339	229	} else if ((*_status)[v] == UNMATCHED) {
deba@339	230	augmentOnArc(a);
deba@339	231	return;
deba@339	232	}
deba@339	233	}
deba@339	234	}
deba@339	235	}
deba@339	236
deba@339	237	void shrinkOnEdge(const Edge& e) {
deba@339	238	Node nca = INVALID;
deba@339	239
deba@339	240	{
deba@339	241	std::set<Node> left_set, right_set;
deba@339	242
deba@339	243	Node left = (*_blossom_rep)[_blossom_set->find(_graph.u(e))];
deba@339	244	left_set.insert(left);
deba@339	245
deba@339	246	Node right = (*_blossom_rep)[_blossom_set->find(_graph.v(e))];
deba@339	247	right_set.insert(right);
deba@339	248
deba@339	249	while (true) {
deba@339	250	if ((*_matching)[left] == INVALID) break;
deba@339	251	left = _graph.target((*_matching)[left]);
deba@339	252	left = (*_blossom_rep)[_blossom_set->
deba@339	253	find(_graph.target((*_ear)[left]))];
deba@339	254	if (right_set.find(left) != right_set.end()) {
deba@339	255	nca = left;
deba@339	256	break;
deba@339	257	}
deba@339	258	left_set.insert(left);
deba@339	259
deba@339	260	if ((*_matching)[right] == INVALID) break;
deba@339	261	right = _graph.target((*_matching)[right]);
deba@339	262	right = (*_blossom_rep)[_blossom_set->
deba@339	263	find(_graph.target((*_ear)[right]))];
deba@339	264	if (left_set.find(right) != left_set.end()) {
deba@339	265	nca = right;
deba@339	266	break;
deba@339	267	}
deba@339	268	right_set.insert(right);
deba@339	269	}
deba@339	270
deba@339	271	if (nca == INVALID) {
deba@339	272	if ((*_matching)[left] == INVALID) {
deba@339	273	nca = right;
deba@339	274	while (left_set.find(nca) == left_set.end()) {
deba@339	275	nca = _graph.target((*_matching)[nca]);
deba@339	276	nca =(*_blossom_rep)[_blossom_set->
deba@339	277	find(_graph.target((*_ear)[nca]))];
deba@339	278	}
deba@339	279	} else {
deba@339	280	nca = left;
deba@339	281	while (right_set.find(nca) == right_set.end()) {
deba@339	282	nca = _graph.target((*_matching)[nca]);
deba@339	283	nca = (*_blossom_rep)[_blossom_set->
deba@339	284	find(_graph.target((*_ear)[nca]))];
deba@339	285	}
deba@339	286	}
deba@339	287	}
deba@339	288	}
deba@339	289
deba@339	290	{
deba@339	291
deba@339	292	Node node = _graph.u(e);
deba@339	293	Arc arc = _graph.direct(e, true);
deba@339	294	Node base = (*_blossom_rep)[_blossom_set->find(node)];
deba@339	295
deba@339	296	while (base != nca) {
kpeter@628	297	(*_ear)[node] = arc;
deba@339	298
deba@339	299	Node n = node;
deba@339	300	while (n != base) {
deba@339	301	n = _graph.target((*_matching)[n]);
deba@339	302	Arc a = (*_ear)[n];
deba@339	303	n = _graph.target(a);
kpeter@628	304	(*_ear)[n] = _graph.oppositeArc(a);
deba@339	305	}
deba@339	306	node = _graph.target((*_matching)[base]);
deba@339	307	_tree_set->erase(base);
deba@339	308	_tree_set->erase(node);
deba@339	309	_blossom_set->insert(node, _blossom_set->find(base));
kpeter@628	310	(*_status)[node] = EVEN;
deba@339	311	_node_queue[_last++] = node;
deba@339	312	arc = _graph.oppositeArc((*_ear)[node]);
deba@339	313	node = _graph.target((*_ear)[node]);
deba@339	314	base = (*_blossom_rep)[_blossom_set->find(node)];
deba@339	315	_blossom_set->join(_graph.target(arc), base);
deba@339	316	}
deba@339	317	}
deba@339	318
kpeter@628	319	(*_blossom_rep)[_blossom_set->find(nca)] = nca;
deba@339	320
deba@339	321	{
deba@339	322
deba@339	323	Node node = _graph.v(e);
deba@339	324	Arc arc = _graph.direct(e, false);
deba@339	325	Node base = (*_blossom_rep)[_blossom_set->find(node)];
deba@339	326
deba@339	327	while (base != nca) {
kpeter@628	328	(*_ear)[node] = arc;
deba@339	329
deba@339	330	Node n = node;
deba@339	331	while (n != base) {
deba@339	332	n = _graph.target((*_matching)[n]);
deba@339	333	Arc a = (*_ear)[n];
deba@339	334	n = _graph.target(a);
kpeter@628	335	(*_ear)[n] = _graph.oppositeArc(a);
deba@339	336	}
deba@339	337	node = _graph.target((*_matching)[base]);
deba@339	338	_tree_set->erase(base);
deba@339	339	_tree_set->erase(node);
deba@339	340	_blossom_set->insert(node, _blossom_set->find(base));
kpeter@628	341	(*_status)[node] = EVEN;
deba@339	342	_node_queue[_last++] = node;
deba@339	343	arc = _graph.oppositeArc((*_ear)[node]);
deba@339	344	node = _graph.target((*_ear)[node]);
deba@339	345	base = (*_blossom_rep)[_blossom_set->find(node)];
deba@339	346	_blossom_set->join(_graph.target(arc), base);
deba@339	347	}
deba@339	348	}
deba@339	349
kpeter@628	350	(*_blossom_rep)[_blossom_set->find(nca)] = nca;
deba@339	351	}
deba@339	352
deba@339	353	void extendOnArc(const Arc& a) {
deba@339	354	Node base = _graph.source(a);
deba@339	355	Node odd = _graph.target(a);
deba@339	356
kpeter@628	357	(*_ear)[odd] = _graph.oppositeArc(a);
deba@339	358	Node even = _graph.target((*_matching)[odd]);
kpeter@628	359	(*_blossom_rep)[_blossom_set->insert(even)] = even;
kpeter@628	360	(*_status)[odd] = ODD;
kpeter@628	361	(*_status)[even] = EVEN;
deba@339	362	int tree = _tree_set->find((*_blossom_rep)[_blossom_set->find(base)]);
deba@339	363	_tree_set->insert(odd, tree);
deba@339	364	_tree_set->insert(even, tree);
deba@339	365	_node_queue[_last++] = even;
deba@339	366
deba@339	367	}
deba@339	368
deba@339	369	void augmentOnArc(const Arc& a) {
deba@339	370	Node even = _graph.source(a);
deba@339	371	Node odd = _graph.target(a);
deba@339	372
deba@339	373	int tree = _tree_set->find((*_blossom_rep)[_blossom_set->find(even)]);
deba@339	374
kpeter@628	375	(*_matching)[odd] = _graph.oppositeArc(a);
kpeter@628	376	(*_status)[odd] = MATCHED;
deba@339	377
deba@339	378	Arc arc = (*_matching)[even];
kpeter@628	379	(*_matching)[even] = a;
deba@339	380
deba@339	381	while (arc != INVALID) {
deba@339	382	odd = _graph.target(arc);
deba@339	383	arc = (*_ear)[odd];
deba@339	384	even = _graph.target(arc);
kpeter@628	385	(*_matching)[odd] = arc;
deba@339	386	arc = (*_matching)[even];
kpeter@628	387	(_matching)[even] = _graph.oppositeArc((_matching)[odd]);
deba@339	388	}
deba@339	389
deba@339	390	for (typename TreeSet::ItemIt it(*_tree_set, tree);
deba@339	391	it != INVALID; ++it) {
deba@339	392	if ((*_status)[it] == ODD) {
kpeter@628	393	(*_status)[it] = MATCHED;
deba@339	394	} else {
deba@339	395	int blossom = _blossom_set->find(it);
deba@339	396	for (typename BlossomSet::ItemIt jt(*_blossom_set, blossom);
deba@339	397	jt != INVALID; ++jt) {
kpeter@628	398	(*_status)[jt] = MATCHED;
deba@339	399	}
deba@339	400	_blossom_set->eraseClass(blossom);
deba@339	401	}
deba@339	402	}
deba@339	403	_tree_set->eraseClass(tree);
deba@339	404
deba@339	405	}
deba@338	406
deba@338	407	public:
deba@338	408
deba@339	409	/// \brief Constructor
deba@338	410	///
deba@339	411	/// Constructor.
deba@339	412	MaxMatching(const Graph& graph)
deba@339	413	: _graph(graph), _matching(0), _status(0), _ear(0),
deba@339	414	_blossom_set_index(0), _blossom_set(0), _blossom_rep(0),
deba@339	415	_tree_set_index(0), _tree_set(0) {}
deba@339	416
deba@339	417	~MaxMatching() {
deba@339	418	destroyStructures();
deba@339	419	}
deba@339	420
kpeter@637	421	/// \name Execution Control
alpar@342	422	/// The simplest way to execute the algorithm is to use the
kpeter@637	423	/// \c run() member function.\n
kpeter@637	424	/// If you need better control on the execution, you have to call
kpeter@637	425	/// one of the functions \ref init(), \ref greedyInit() or
kpeter@637	426	/// \ref matchingInit() first, then you can start the algorithm with
kpeter@637	427	/// \ref startSparse() or \ref startDense().
deba@339	428
deba@339	429	///@{
deba@339	430
kpeter@637	431	/// \brief Set the initial matching to the empty matching.
deba@338	432	///
kpeter@637	433	/// This function sets the initial matching to the empty matching.
deba@338	434	void init() {
deba@339	435	createStructures();
deba@339	436	for(NodeIt n(_graph); n != INVALID; ++n) {
kpeter@628	437	(*_matching)[n] = INVALID;
kpeter@628	438	(*_status)[n] = UNMATCHED;
deba@338	439	}
deba@338	440	}
deba@338	441
kpeter@637	442	/// \brief Find an initial matching in a greedy way.
deba@338	443	///
kpeter@637	444	/// This function finds an initial matching in a greedy way.
deba@338	445	void greedyInit() {
deba@339	446	createStructures();
deba@339	447	for (NodeIt n(_graph); n != INVALID; ++n) {
kpeter@628	448	(*_matching)[n] = INVALID;
kpeter@628	449	(*_status)[n] = UNMATCHED;
deba@338	450	}
deba@339	451	for (NodeIt n(_graph); n != INVALID; ++n) {
deba@339	452	if ((*_matching)[n] == INVALID) {
deba@339	453	for (OutArcIt a(_graph, n); a != INVALID ; ++a) {
deba@339	454	Node v = _graph.target(a);
deba@339	455	if ((*_matching)[v] == INVALID && v != n) {
kpeter@628	456	(*_matching)[n] = a;
kpeter@628	457	(*_status)[n] = MATCHED;
kpeter@628	458	(*_matching)[v] = _graph.oppositeArc(a);
kpeter@628	459	(*_status)[v] = MATCHED;
deba@338	460	break;
deba@338	461	}
deba@338	462	}
deba@338	463	}
deba@338	464	}
deba@338	465	}
deba@338	466
deba@339	467
kpeter@637	468	/// \brief Initialize the matching from a map.
deba@338	469	///
kpeter@637	470	/// This function initializes the matching from a \c bool valued edge
kpeter@637	471	/// map. This map should have the property that there are no two incident
kpeter@637	472	/// edges with \c true value, i.e. it really contains a matching.
kpeter@606	473	/// \return \c true if the map contains a matching.
deba@339	474	template <typename MatchingMap>
deba@339	475	bool matchingInit(const MatchingMap& matching) {
deba@339	476	createStructures();
deba@339	477
deba@339	478	for (NodeIt n(_graph); n != INVALID; ++n) {
kpeter@628	479	(*_matching)[n] = INVALID;
kpeter@628	480	(*_status)[n] = UNMATCHED;
deba@338	481	}
deba@339	482	for(EdgeIt e(_graph); e!=INVALID; ++e) {
deba@339	483	if (matching[e]) {
deba@339	484
deba@339	485	Node u = _graph.u(e);
deba@339	486	if ((*_matching)[u] != INVALID) return false;
kpeter@628	487	(*_matching)[u] = _graph.direct(e, true);
kpeter@628	488	(*_status)[u] = MATCHED;
deba@339	489
deba@339	490	Node v = _graph.v(e);
deba@339	491	if ((*_matching)[v] != INVALID) return false;
kpeter@628	492	(*_matching)[v] = _graph.direct(e, false);
kpeter@628	493	(*_status)[v] = MATCHED;
deba@339	494	}
deba@339	495	}
deba@339	496	return true;
deba@338	497	}
deba@338	498
kpeter@637	499	/// \brief Start Edmonds' algorithm
deba@338	500	///
kpeter@637	501	/// This function runs the original Edmonds' algorithm.
kpeter@637	502	///
kpeter@698	503	/// \pre \ref init(), \ref greedyInit() or \ref matchingInit() must be
kpeter@637	504	/// called before using this function.
deba@339	505	void startSparse() {
deba@339	506	for(NodeIt n(_graph); n != INVALID; ++n) {
deba@339	507	if ((*_status)[n] == UNMATCHED) {
deba@339	508	(*_blossom_rep)[_blossom_set->insert(n)] = n;
deba@339	509	_tree_set->insert(n);
kpeter@628	510	(*_status)[n] = EVEN;
deba@339	511	processSparse(n);
deba@338	512	}
deba@338	513	}
deba@338	514	}
deba@338	515
deba@947	516	/// \brief Start Edmonds' algorithm with a heuristic improvement
kpeter@637	517	/// for dense graphs
deba@338	518	///
kpeter@637	519	/// This function runs Edmonds' algorithm with a heuristic of postponing
alpar@342	520	/// shrinks, therefore resulting in a faster algorithm for dense graphs.
kpeter@637	521	///
kpeter@698	522	/// \pre \ref init(), \ref greedyInit() or \ref matchingInit() must be
kpeter@637	523	/// called before using this function.
deba@339	524	void startDense() {
deba@339	525	for(NodeIt n(_graph); n != INVALID; ++n) {
deba@339	526	if ((*_status)[n] == UNMATCHED) {
deba@339	527	(*_blossom_rep)[_blossom_set->insert(n)] = n;
deba@339	528	_tree_set->insert(n);
kpeter@628	529	(*_status)[n] = EVEN;
deba@339	530	processDense(n);
deba@339	531	}
deba@339	532	}
deba@339	533	}
deba@339	534
deba@339	535
kpeter@637	536	/// \brief Run Edmonds' algorithm
deba@339	537	///
deba@947	538	/// This function runs Edmonds' algorithm. An additional heuristic of
deba@947	539	/// postponing shrinks is used for relatively dense graphs
kpeter@637	540	/// (for which <tt>m>=2*n</tt> holds).
deba@338	541	void run() {
deba@339	542	if (countEdges(_graph) < 2 * countNodes(_graph)) {
deba@338	543	greedyInit();
deba@338	544	startSparse();
deba@338	545	} else {
deba@338	546	init();
deba@338	547	startDense();
deba@338	548	}
deba@338	549	}
deba@338	550
deba@339	551	/// @}
deba@339	552
kpeter@637	553	/// \name Primal Solution
kpeter@637	554	/// Functions to get the primal solution, i.e. the maximum matching.
deba@339	555
deba@339	556	/// @{
deba@338	557
kpeter@637	558	/// \brief Return the size (cardinality) of the matching.
deba@338	559	///
deba@947	560	/// This function returns the size (cardinality) of the current matching.
kpeter@637	561	/// After run() it returns the size of the maximum matching in the graph.
deba@339	562	int matchingSize() const {
deba@339	563	int size = 0;
deba@339	564	for (NodeIt n(_graph); n != INVALID; ++n) {
deba@339	565	if ((*_matching)[n] != INVALID) {
deba@339	566	++size;
deba@338	567	}
deba@338	568	}
deba@339	569	return size / 2;
deba@338	570	}
deba@338	571
kpeter@637	572	/// \brief Return \c true if the given edge is in the matching.
deba@339	573	///
deba@947	574	/// This function returns \c true if the given edge is in the current
kpeter@637	575	/// matching.
deba@339	576	bool matching(const Edge& edge) const {
deba@339	577	return edge == (*_matching)[_graph.u(edge)];
deba@339	578	}
deba@339	579
kpeter@637	580	/// \brief Return the matching arc (or edge) incident to the given node.
deba@339	581	///
kpeter@637	582	/// This function returns the matching arc (or edge) incident to the
deba@947	583	/// given node in the current matching or \c INVALID if the node is
kpeter@637	584	/// not covered by the matching.
deba@339	585	Arc matching(const Node& n) const {
deba@339	586	return (*_matching)[n];
deba@339	587	}
deba@338	588
kpeter@640	589	/// \brief Return a const reference to the matching map.
kpeter@640	590	///
kpeter@640	591	/// This function returns a const reference to a node map that stores
kpeter@640	592	/// the matching arc (or edge) incident to each node.
kpeter@640	593	const MatchingMap& matchingMap() const {
kpeter@640	594	return *_matching;
kpeter@640	595	}
kpeter@640	596
kpeter@637	597	/// \brief Return the mate of the given node.
deba@338	598	///
deba@947	599	/// This function returns the mate of the given node in the current
kpeter@637	600	/// matching or \c INVALID if the node is not covered by the matching.
deba@339	601	Node mate(const Node& n) const {
deba@339	602	return (*_matching)[n] != INVALID ?
deba@339	603	_graph.target((*_matching)[n]) : INVALID;
deba@338	604	}
deba@338	605
deba@339	606	/// @}
deba@339	607
kpeter@637	608	/// \name Dual Solution
deba@947	609	/// Functions to get the dual solution, i.e. the Gallai-Edmonds
kpeter@637	610	/// decomposition.
deba@339	611
deba@339	612	/// @{
deba@338	613
kpeter@637	614	/// \brief Return the status of the given node in the Edmonds-Gallai
deba@338	615	/// decomposition.
deba@338	616	///
kpeter@637	617	/// This function returns the \ref Status "status" of the given node
kpeter@637	618	/// in the Edmonds-Gallai decomposition.
kpeter@640	619	Status status(const Node& n) const {
deba@339	620	return (*_status)[n];
deba@338	621	}
deba@338	622
kpeter@640	623	/// \brief Return a const reference to the status map, which stores
kpeter@640	624	/// the Edmonds-Gallai decomposition.
kpeter@640	625	///
kpeter@640	626	/// This function returns a const reference to a node map that stores the
kpeter@640	627	/// \ref Status "status" of each node in the Edmonds-Gallai decomposition.
kpeter@640	628	const StatusMap& statusMap() const {
kpeter@640	629	return *_status;
kpeter@640	630	}
kpeter@640	631
kpeter@637	632	/// \brief Return \c true if the given node is in the barrier.
deba@338	633	///
kpeter@637	634	/// This function returns \c true if the given node is in the barrier.
deba@339	635	bool barrier(const Node& n) const {
deba@339	636	return (*_status)[n] == ODD;
deba@338	637	}
deba@338	638
deba@339	639	/// @}
deba@338	640
deba@338	641	};
deba@338	642
deba@338	643	/// \ingroup matching
deba@338	644	///
deba@338	645	/// \brief Weighted matching in general graphs
deba@338	646	///
deba@338	647	/// This class provides an efficient implementation of Edmond's
deba@338	648	/// maximum weighted matching algorithm. The implementation is based
deba@338	649	/// on extensive use of priority queues and provides
kpeter@606	650	/// \f$O(nm\log n)\f$ time complexity.
deba@338	651	///
deba@947	652	/// The maximum weighted matching problem is to find a subset of the
deba@947	653	/// edges in an undirected graph with maximum overall weight for which
kpeter@637	654	/// each node has at most one incident edge.
kpeter@637	655	/// It can be formulated with the following linear program.
deba@338	656	/// \f[ \sum_{e \in \delta(u)}x_e \le 1 \quad \forall u\in V\f]
deba@339	657	/** \f[ \sum_{e \in \gamma(B)}x_e \le \frac{\vert B \vert - 1}{2}
deba@339	658	\quad \forall B\in\mathcal{O}\f] */
deba@338	659	/// \f[x_e \ge 0\quad \forall e\in E\f]
deba@338	660	/// \f[\max \sum_{e\in E}x_ew_e\f]
deba@339	661	/// where \f$\delta(X)\f$ is the set of edges incident to a node in
deba@339	662	/// \f$X\f$, \f$\gamma(X)\f$ is the set of edges with both ends in
deba@339	663	/// \f$X\f$ and \f$\mathcal{O}\f$ is the set of odd cardinality
deba@339	664	/// subsets of the nodes.
deba@338	665	///
deba@338	666	/// The algorithm calculates an optimal matching and a proof of the
deba@338	667	/// optimality. The solution of the dual problem can be used to check
deba@339	668	/// the result of the algorithm. The dual linear problem is the
kpeter@637	669	/// following.
deba@339	670	/** \f[ y_u + y_v + \sum_{B \in \mathcal{O}, uv \in \gamma(B)}
deba@339	671	z_B \ge w_{uv} \quad \forall uv\in E\f] */
deba@338	672	/// \f[y_u \ge 0 \quad \forall u \in V\f]
deba@338	673	/// \f[z_B \ge 0 \quad \forall B \in \mathcal{O}\f]
deba@339	674	/** \f[\min \sum_{u \in V}y_u + \sum_{B \in \mathcal{O}}
deba@339	675	\frac{\vert B \vert - 1}{2}z_B\f] */
deba@338	676	///
deba@947	677	/// The algorithm can be executed with the run() function.
kpeter@637	678	/// After it the matching (the primal solution) and the dual solution
deba@947	679	/// can be obtained using the query functions and the
deba@947	680	/// \ref MaxWeightedMatching::BlossomIt "BlossomIt" nested class,
deba@947	681	/// which is able to iterate on the nodes of a blossom.
kpeter@637	682	/// If the value type is integer, then the dual solution is multiplied
kpeter@637	683	/// by \ref MaxWeightedMatching::dualScale "4".
kpeter@637	684	///
kpeter@640	685	/// \tparam GR The undirected graph type the algorithm runs on.
deba@947	686	/// \tparam WM The type edge weight map. The default type is
kpeter@637	687	/// \ref concepts::Graph::EdgeMap "GR::EdgeMap<int>".
kpeter@637	688	#ifdef DOXYGEN
kpeter@637	689	template <typename GR, typename WM>
kpeter@637	690	#else
kpeter@606	691	template <typename GR,
kpeter@606	692	typename WM = typename GR::template EdgeMap<int> >
kpeter@637	693	#endif
deba@338	694	class MaxWeightedMatching {
deba@338	695	public:
deba@338	696
kpeter@637	697	/// The graph type of the algorithm
kpeter@606	698	typedef GR Graph;
kpeter@637	699	/// The type of the edge weight map
kpeter@606	700	typedef WM WeightMap;
kpeter@637	701	/// The value type of the edge weights
deba@338	702	typedef typename WeightMap::Value Value;
deba@338	703
kpeter@640	704	/// The type of the matching map
kpeter@637	705	typedef typename Graph::template NodeMap<typename Graph::Arc>
kpeter@637	706	MatchingMap;
kpeter@637	707
deba@338	708	/// \brief Scaling factor for dual solution
deba@338	709	///
kpeter@637	710	/// Scaling factor for dual solution. It is equal to 4 or 1
deba@338	711	/// according to the value type.
deba@338	712	static const int dualScale =
deba@338	713	std::numeric_limits<Value>::is_integer ? 4 : 1;
deba@338	714
deba@338	715	private:
deba@338	716
deba@338	717	TEMPLATE_GRAPH_TYPEDEFS(Graph);
deba@338	718
deba@338	719	typedef typename Graph::template NodeMap<Value> NodePotential;
deba@338	720	typedef std::vector<Node> BlossomNodeList;
deba@338	721
deba@338	722	struct BlossomVariable {
deba@338	723	int begin, end;
deba@338	724	Value value;
deba@338	725
deba@338	726	BlossomVariable(int _begin, int _end, Value _value)
deba@338	727	: begin(_begin), end(_end), value(_value) {}
deba@338	728
deba@338	729	};
deba@338	730
deba@338	731	typedef std::vector<BlossomVariable> BlossomPotential;
deba@338	732
deba@338	733	const Graph& _graph;
deba@338	734	const WeightMap& _weight;
deba@338	735
deba@338	736	MatchingMap* _matching;
deba@338	737
deba@338	738	NodePotential* _node_potential;
deba@338	739
deba@338	740	BlossomPotential _blossom_potential;
deba@338	741	BlossomNodeList _blossom_node_list;
deba@338	742
deba@338	743	int _node_num;
deba@338	744	int _blossom_num;
deba@338	745
deba@338	746	typedef RangeMap<int> IntIntMap;
deba@338	747
deba@338	748	enum Status {
deba@947	749	EVEN = -1, MATCHED = 0, ODD = 1
deba@338	750	};
deba@338	751
deba@339	752	typedef HeapUnionFind<Value, IntNodeMap> BlossomSet;
deba@338	753	struct BlossomData {
deba@338	754	int tree;
deba@338	755	Status status;
deba@338	756	Arc pred, next;
deba@338	757	Value pot, offset;
deba@338	758	Node base;
deba@338	759	};
deba@338	760
deba@339	761	IntNodeMap *_blossom_index;
deba@338	762	BlossomSet *_blossom_set;
deba@338	763	RangeMap<BlossomData>* _blossom_data;
deba@338	764
deba@339	765	IntNodeMap *_node_index;
deba@339	766	IntArcMap *_node_heap_index;
deba@338	767
deba@338	768	struct NodeData {
deba@338	769
deba@339	770	NodeData(IntArcMap& node_heap_index)
deba@338	771	: heap(node_heap_index) {}
deba@338	772
deba@338	773	int blossom;
deba@338	774	Value pot;
deba@339	775	BinHeap<Value, IntArcMap> heap;
deba@338	776	std::map<int, Arc> heap_index;
deba@338	777
deba@338	778	int tree;
deba@338	779	};
deba@338	780
deba@338	781	RangeMap<NodeData>* _node_data;
deba@338	782
deba@338	783	typedef ExtendFindEnum<IntIntMap> TreeSet;
deba@338	784
deba@338	785	IntIntMap *_tree_set_index;
deba@338	786	TreeSet *_tree_set;
deba@338	787
deba@339	788	IntNodeMap *_delta1_index;
deba@339	789	BinHeap<Value, IntNodeMap> *_delta1;
deba@338	790
deba@338	791	IntIntMap *_delta2_index;
deba@338	792	BinHeap<Value, IntIntMap> *_delta2;
deba@338	793
deba@339	794	IntEdgeMap *_delta3_index;
deba@339	795	BinHeap<Value, IntEdgeMap> *_delta3;
deba@338	796
deba@338	797	IntIntMap *_delta4_index;
deba@338	798	BinHeap<Value, IntIntMap> *_delta4;
deba@338	799
deba@338	800	Value _delta_sum;
deba@949	801	int _unmatched;
deba@949	802
deba@949	803	typedef MaxWeightedFractionalMatching<Graph, WeightMap> FractionalMatching;
deba@949	804	FractionalMatching *_fractional;
deba@338	805
deba@338	806	void createStructures() {
deba@338	807	_node_num = countNodes(_graph);
deba@338	808	_blossom_num = _node_num * 3 / 2;
deba@338	809
deba@338	810	if (!_matching) {
deba@338	811	_matching = new MatchingMap(_graph);
deba@338	812	}
deba@945	813
deba@338	814	if (!_node_potential) {
deba@338	815	_node_potential = new NodePotential(_graph);
deba@338	816	}
deba@945	817
deba@338	818	if (!_blossom_set) {
deba@339	819	_blossom_index = new IntNodeMap(_graph);
deba@338	820	_blossom_set = new BlossomSet(*_blossom_index);
deba@338	821	_blossom_data = new RangeMap<BlossomData>(_blossom_num);
deba@945	822	} else if (_blossom_data->size() != _blossom_num) {
deba@945	823	delete _blossom_data;
deba@945	824	_blossom_data = new RangeMap<BlossomData>(_blossom_num);
deba@338	825	}
deba@338	826
deba@338	827	if (!_node_index) {
deba@339	828	_node_index = new IntNodeMap(_graph);
deba@339	829	_node_heap_index = new IntArcMap(_graph);
deba@338	830	_node_data = new RangeMap<NodeData>(_node_num,
deba@945	831	NodeData(*_node_heap_index));
deba@945	832	} else {
deba@945	833	delete _node_data;
deba@945	834	_node_data = new RangeMap<NodeData>(_node_num,
deba@945	835	NodeData(*_node_heap_index));
deba@338	836	}
deba@338	837
deba@338	838	if (!_tree_set) {
deba@338	839	_tree_set_index = new IntIntMap(_blossom_num);
deba@338	840	_tree_set = new TreeSet(*_tree_set_index);
deba@945	841	} else {
deba@945	842	_tree_set_index->resize(_blossom_num);
deba@338	843	}
deba@945	844
deba@338	845	if (!_delta1) {
deba@339	846	_delta1_index = new IntNodeMap(_graph);
deba@339	847	_delta1 = new BinHeap<Value, IntNodeMap>(*_delta1_index);
deba@338	848	}
deba@945	849
deba@338	850	if (!_delta2) {
deba@338	851	_delta2_index = new IntIntMap(_blossom_num);
deba@338	852	_delta2 = new BinHeap<Value, IntIntMap>(*_delta2_index);
deba@945	853	} else {
deba@945	854	_delta2_index->resize(_blossom_num);
deba@338	855	}
deba@945	856
deba@338	857	if (!_delta3) {
deba@339	858	_delta3_index = new IntEdgeMap(_graph);
deba@339	859	_delta3 = new BinHeap<Value, IntEdgeMap>(*_delta3_index);
deba@338	860	}
deba@945	861
deba@338	862	if (!_delta4) {
deba@338	863	_delta4_index = new IntIntMap(_blossom_num);
deba@338	864	_delta4 = new BinHeap<Value, IntIntMap>(*_delta4_index);
deba@945	865	} else {
deba@945	866	_delta4_index->resize(_blossom_num);
deba@338	867	}
deba@338	868	}
deba@338	869
deba@338	870	void destroyStructures() {
deba@338	871	if (_matching) {
deba@338	872	delete _matching;
deba@338	873	}
deba@338	874	if (_node_potential) {
deba@338	875	delete _node_potential;
deba@338	876	}
deba@338	877	if (_blossom_set) {
deba@338	878	delete _blossom_index;
deba@338	879	delete _blossom_set;
deba@338	880	delete _blossom_data;
deba@338	881	}
deba@338	882
deba@338	883	if (_node_index) {
deba@338	884	delete _node_index;
deba@338	885	delete _node_heap_index;
deba@338	886	delete _node_data;
deba@338	887	}
deba@338	888
deba@338	889	if (_tree_set) {
deba@338	890	delete _tree_set_index;
deba@338	891	delete _tree_set;
deba@338	892	}
deba@338	893	if (_delta1) {
deba@338	894	delete _delta1_index;
deba@338	895	delete _delta1;
deba@338	896	}
deba@338	897	if (_delta2) {
deba@338	898	delete _delta2_index;
deba@338	899	delete _delta2;
deba@338	900	}
deba@338	901	if (_delta3) {
deba@338	902	delete _delta3_index;
deba@338	903	delete _delta3;
deba@338	904	}
deba@338	905	if (_delta4) {
deba@338	906	delete _delta4_index;
deba@338	907	delete _delta4;
deba@338	908	}
deba@338	909	}
deba@338	910
deba@338	911	void matchedToEven(int blossom, int tree) {
deba@338	912	if (_delta2->state(blossom) == _delta2->IN_HEAP) {
deba@338	913	_delta2->erase(blossom);
deba@338	914	}
deba@338	915
deba@338	916	if (!_blossom_set->trivial(blossom)) {
deba@338	917	(*_blossom_data)[blossom].pot -=
deba@338	918	2 * (_delta_sum - (*_blossom_data)[blossom].offset);
deba@338	919	}
deba@338	920
deba@338	921	for (typename BlossomSet::ItemIt n(*_blossom_set, blossom);
deba@338	922	n != INVALID; ++n) {
deba@338	923
deba@338	924	_blossom_set->increase(n, std::numeric_limits<Value>::max());
deba@338	925	int ni = (*_node_index)[n];
deba@338	926
deba@338	927	(*_node_data)[ni].heap.clear();
deba@338	928	(*_node_data)[ni].heap_index.clear();
deba@338	929
deba@338	930	(_node_data)[ni].pot += _delta_sum - (_blossom_data)[blossom].offset;
deba@338	931
deba@338	932	_delta1->push(n, (*_node_data)[ni].pot);
deba@338	933
deba@338	934	for (InArcIt e(_graph, n); e != INVALID; ++e) {
deba@338	935	Node v = _graph.source(e);
deba@338	936	int vb = _blossom_set->find(v);
deba@338	937	int vi = (*_node_index)[v];
deba@338	938
deba@338	939	Value rw = (_node_data)[ni].pot + (_node_data)[vi].pot -
deba@338	940	dualScale * _weight[e];
deba@338	941
deba@338	942	if ((*_blossom_data)[vb].status == EVEN) {
deba@338	943	if (_delta3->state(e) != _delta3->IN_HEAP && blossom != vb) {
deba@338	944	_delta3->push(e, rw / 2);
deba@338	945	}
deba@338	946	} else {
deba@338	947	typename std::map<int, Arc>::iterator it =
deba@338	948	(*_node_data)[vi].heap_index.find(tree);
deba@338	949
deba@338	950	if (it != (*_node_data)[vi].heap_index.end()) {
deba@338	951	if ((*_node_data)[vi].heap[it->second] > rw) {
deba@338	952	(*_node_data)[vi].heap.replace(it->second, e);
deba@338	953	(*_node_data)[vi].heap.decrease(e, rw);
deba@338	954	it->second = e;
deba@338	955	}
deba@338	956	} else {
deba@338	957	(*_node_data)[vi].heap.push(e, rw);
deba@338	958	(*_node_data)[vi].heap_index.insert(std::make_pair(tree, e));
deba@338	959	}
deba@338	960
deba@338	961	if ((_blossom_set)[v] > (_node_data)[vi].heap.prio()) {
deba@338	962	_blossom_set->decrease(v, (*_node_data)[vi].heap.prio());
deba@338	963
deba@338	964	if ((*_blossom_data)[vb].status == MATCHED) {
deba@338	965	if (_delta2->state(vb) != _delta2->IN_HEAP) {
deba@338	966	_delta2->push(vb, _blossom_set->classPrio(vb) -
deba@338	967	(*_blossom_data)[vb].offset);
deba@338	968	} else if ((*_delta2)[vb] > _blossom_set->classPrio(vb) -
deba@338	969	(*_blossom_data)[vb].offset) {
deba@338	970	_delta2->decrease(vb, _blossom_set->classPrio(vb) -
deba@338	971	(*_blossom_data)[vb].offset);
deba@338	972	}
deba@338	973	}
deba@338	974	}
deba@338	975	}
deba@338	976	}
deba@338	977	}
deba@338	978	(*_blossom_data)[blossom].offset = 0;
deba@338	979	}
deba@338	980
deba@947	981	void matchedToOdd(int blossom) {
deba@338	982	if (_delta2->state(blossom) == _delta2->IN_HEAP) {
deba@338	983	_delta2->erase(blossom);
deba@338	984	}
deba@947	985	(*_blossom_data)[blossom].offset += _delta_sum;
deba@947	986	if (!_blossom_set->trivial(blossom)) {
deba@947	987	_delta4->push(blossom, (*_blossom_data)[blossom].pot / 2 +
deba@947	988	(*_blossom_data)[blossom].offset);
deba@947	989	}
deba@947	990	}
deba@947	991
deba@947	992	void evenToMatched(int blossom, int tree) {
deba@947	993	if (!_blossom_set->trivial(blossom)) {
deba@947	994	(_blossom_data)[blossom].pot += 2 _delta_sum;
deba@947	995	}
deba@338	996
deba@338	997	for (typename BlossomSet::ItemIt n(*_blossom_set, blossom);
deba@338	998	n != INVALID; ++n) {
deba@338	999	int ni = (*_node_index)[n];
deba@947	1000	(*_node_data)[ni].pot -= _delta_sum;
deba@947	1001
deba@947	1002	_delta1->erase(n);
deba@947	1003
deba@947	1004	for (InArcIt e(_graph, n); e != INVALID; ++e) {
deba@947	1005	Node v = _graph.source(e);
deba@338	1006	int vb = _blossom_set->find(v);
deba@338	1007	int vi = (*_node_index)[v];
deba@338	1008
deba@338	1009	Value rw = (_node_data)[ni].pot + (_node_data)[vi].pot -
deba@338	1010	dualScale * _weight[e];
deba@338	1011
deba@947	1012	if (vb == blossom) {
deba@947	1013	if (_delta3->state(e) == _delta3->IN_HEAP) {
deba@947	1014	_delta3->erase(e);
deba@947	1015	}
deba@947	1016	} else if ((*_blossom_data)[vb].status == EVEN) {
deba@947	1017
deba@947	1018	if (_delta3->state(e) == _delta3->IN_HEAP) {
deba@947	1019	_delta3->erase(e);
deba@947	1020	}
deba@947	1021
deba@947	1022	int vt = _tree_set->find(vb);
deba@947	1023
deba@947	1024	if (vt != tree) {
deba@947	1025
deba@947	1026	Arc r = _graph.oppositeArc(e);
deba@947	1027
deba@947	1028	typename std::map<int, Arc>::iterator it =
deba@947	1029	(*_node_data)[ni].heap_index.find(vt);
deba@947	1030
deba@947	1031	if (it != (*_node_data)[ni].heap_index.end()) {
deba@947	1032	if ((*_node_data)[ni].heap[it->second] > rw) {
deba@947	1033	(*_node_data)[ni].heap.replace(it->second, r);
deba@947	1034	(*_node_data)[ni].heap.decrease(r, rw);
deba@947	1035	it->second = r;
deba@947	1036	}
deba@947	1037	} else {
deba@947	1038	(*_node_data)[ni].heap.push(r, rw);
deba@947	1039	(*_node_data)[ni].heap_index.insert(std::make_pair(vt, r));
deba@947	1040	}
deba@947	1041
deba@947	1042	if ((_blossom_set)[n] > (_node_data)[ni].heap.prio()) {
deba@947	1043	_blossom_set->decrease(n, (*_node_data)[ni].heap.prio());
deba@947	1044
deba@947	1045	if (_delta2->state(blossom) != _delta2->IN_HEAP) {
deba@947	1046	_delta2->push(blossom, _blossom_set->classPrio(blossom) -
deba@947	1047	(*_blossom_data)[blossom].offset);
deba@947	1048	} else if ((*_delta2)[blossom] >
deba@947	1049	_blossom_set->classPrio(blossom) -
deba@947	1050	(*_blossom_data)[blossom].offset){
deba@947	1051	_delta2->decrease(blossom, _blossom_set->classPrio(blossom) -
deba@947	1052	(*_blossom_data)[blossom].offset);
deba@947	1053	}
deba@947	1054	}
deba@947	1055	}
deba@947	1056	} else {
deba@947	1057
deba@947	1058	typename std::map<int, Arc>::iterator it =
deba@947	1059	(*_node_data)[vi].heap_index.find(tree);
deba@947	1060
deba@947	1061	if (it != (*_node_data)[vi].heap_index.end()) {
deba@947	1062	(*_node_data)[vi].heap.erase(it->second);
deba@947	1063	(*_node_data)[vi].heap_index.erase(it);
deba@947	1064	if ((*_node_data)[vi].heap.empty()) {
deba@947	1065	_blossom_set->increase(v, std::numeric_limits<Value>::max());
deba@947	1066	} else if ((_blossom_set)[v] < (_node_data)[vi].heap.prio()) {
deba@947	1067	_blossom_set->increase(v, (*_node_data)[vi].heap.prio());
deba@947	1068	}
deba@947	1069
deba@947	1070	if ((*_blossom_data)[vb].status == MATCHED) {
deba@947	1071	if (_blossom_set->classPrio(vb) ==
deba@947	1072	std::numeric_limits<Value>::max()) {
deba@947	1073	_delta2->erase(vb);
deba@947	1074	} else if ((*_delta2)[vb] < _blossom_set->classPrio(vb) -
deba@947	1075	(*_blossom_data)[vb].offset) {
deba@947	1076	_delta2->increase(vb, _blossom_set->classPrio(vb) -
deba@947	1077	(*_blossom_data)[vb].offset);
deba@947	1078	}
deba@947	1079	}
deba@338	1080	}
deba@338	1081	}
deba@338	1082	}
deba@338	1083	}
deba@338	1084	}
deba@338	1085
deba@947	1086	void oddToMatched(int blossom) {
deba@947	1087	(*_blossom_data)[blossom].offset -= _delta_sum;
deba@947	1088
deba@947	1089	if (_blossom_set->classPrio(blossom) !=
deba@947	1090	std::numeric_limits<Value>::max()) {
deba@947	1091	_delta2->push(blossom, _blossom_set->classPrio(blossom) -
deba@947	1092	(*_blossom_data)[blossom].offset);
deba@947	1093	}
deba@947	1094
deba@947	1095	if (!_blossom_set->trivial(blossom)) {
deba@947	1096	_delta4->erase(blossom);
deba@947	1097	}
deba@947	1098	}
deba@947	1099
deba@947	1100	void oddToEven(int blossom, int tree) {
deba@947	1101	if (!_blossom_set->trivial(blossom)) {
deba@947	1102	_delta4->erase(blossom);
deba@947	1103	(*_blossom_data)[blossom].pot -=
deba@947	1104	2 * (2 * _delta_sum - (*_blossom_data)[blossom].offset);
deba@947	1105	}
deba@947	1106
deba@338	1107	for (typename BlossomSet::ItemIt n(*_blossom_set, blossom);
deba@338	1108	n != INVALID; ++n) {
deba@338	1109	int ni = (*_node_index)[n];
deba@338	1110
deba@947	1111	_blossom_set->increase(n, std::numeric_limits<Value>::max());
deba@947	1112
deba@947	1113	(*_node_data)[ni].heap.clear();
deba@947	1114	(*_node_data)[ni].heap_index.clear();
deba@947	1115	(*_node_data)[ni].pot +=
deba@947	1116	2 * _delta_sum - (*_blossom_data)[blossom].offset;
deba@947	1117
deba@947	1118	_delta1->push(n, (*_node_data)[ni].pot);
deba@947	1119
deba@338	1120	for (InArcIt e(_graph, n); e != INVALID; ++e) {
deba@338	1121	Node v = _graph.source(e);
deba@338	1122	int vb = _blossom_set->find(v);
deba@338	1123	int vi = (*_node_index)[v];
deba@338	1124
deba@338	1125	Value rw = (_node_data)[ni].pot + (_node_data)[vi].pot -
deba@338	1126	dualScale * _weight[e];
deba@338	1127
deba@947	1128	if ((*_blossom_data)[vb].status == EVEN) {
deba@947	1129	if (_delta3->state(e) != _delta3->IN_HEAP && blossom != vb) {
deba@947	1130	_delta3->push(e, rw / 2);
deba@338	1131	}
deba@947	1132	} else {
deba@338	1133
deba@338	1134	typename std::map<int, Arc>::iterator it =
deba@947	1135	(*_node_data)[vi].heap_index.find(tree);
deba@947	1136
deba@947	1137	if (it != (*_node_data)[vi].heap_index.end()) {
deba@947	1138	if ((*_node_data)[vi].heap[it->second] > rw) {
deba@947	1139	(*_node_data)[vi].heap.replace(it->second, e);
deba@947	1140	(*_node_data)[vi].heap.decrease(e, rw);
deba@947	1141	it->second = e;
deba@338	1142	}
deba@338	1143	} else {
deba@947	1144	(*_node_data)[vi].heap.push(e, rw);
deba@947	1145	(*_node_data)[vi].heap_index.insert(std::make_pair(tree, e));
deba@338	1146	}
deba@338	1147
deba@947	1148	if ((_blossom_set)[v] > (_node_data)[vi].heap.prio()) {
deba@947	1149	_blossom_set->decrease(v, (*_node_data)[vi].heap.prio());
deba@947	1150
deba@947	1151	if ((*_blossom_data)[vb].status == MATCHED) {
deba@947	1152	if (_delta2->state(vb) != _delta2->IN_HEAP) {
deba@947	1153	_delta2->push(vb, _blossom_set->classPrio(vb) -
deba@947	1154	(*_blossom_data)[vb].offset);
deba@947	1155	} else if ((*_delta2)[vb] > _blossom_set->classPrio(vb) -
deba@947	1156	(*_blossom_data)[vb].offset) {
deba@947	1157	_delta2->decrease(vb, _blossom_set->classPrio(vb) -
deba@947	1158	(*_blossom_data)[vb].offset);
deba@947	1159	}
deba@338	1160	}
deba@338	1161	}
deba@338	1162	}
deba@338	1163	}
deba@338	1164	}
deba@947	1165	(*_blossom_data)[blossom].offset = 0;
deba@338	1166	}
deba@338	1167
deba@338	1168	void alternatePath(int even, int tree) {
deba@338	1169	int odd;
deba@338	1170
deba@338	1171	evenToMatched(even, tree);
deba@338	1172	(*_blossom_data)[even].status = MATCHED;
deba@338	1173
deba@338	1174	while ((*_blossom_data)[even].pred != INVALID) {
deba@338	1175	odd = _blossom_set->find(_graph.target((*_blossom_data)[even].pred));
deba@338	1176	(*_blossom_data)[odd].status = MATCHED;
deba@338	1177	oddToMatched(odd);
deba@338	1178	(_blossom_data)[odd].next = (_blossom_data)[odd].pred;
deba@338	1179
deba@338	1180	even = _blossom_set->find(_graph.target((*_blossom_data)[odd].pred));
deba@338	1181	(*_blossom_data)[even].status = MATCHED;
deba@338	1182	evenToMatched(even, tree);
deba@338	1183	(*_blossom_data)[even].next =
deba@338	1184	_graph.oppositeArc((*_blossom_data)[odd].pred);
deba@338	1185	}
deba@338	1186
deba@338	1187	}
deba@338	1188
deba@338	1189	void destroyTree(int tree) {
deba@338	1190	for (TreeSet::ItemIt b(*_tree_set, tree); b != INVALID; ++b) {
deba@338	1191	if ((*_blossom_data)[b].status == EVEN) {
deba@338	1192	(*_blossom_data)[b].status = MATCHED;
deba@338	1193	evenToMatched(b, tree);
deba@338	1194	} else if ((*_blossom_data)[b].status == ODD) {
deba@338	1195	(*_blossom_data)[b].status = MATCHED;
deba@338	1196	oddToMatched(b);
deba@338	1197	}
deba@338	1198	}
deba@338	1199	_tree_set->eraseClass(tree);
deba@338	1200	}
deba@338	1201
deba@338	1202
deba@338	1203	void unmatchNode(const Node& node) {
deba@338	1204	int blossom = _blossom_set->find(node);
deba@338	1205	int tree = _tree_set->find(blossom);
deba@338	1206
deba@338	1207	alternatePath(blossom, tree);
deba@338	1208	destroyTree(tree);
deba@338	1209
deba@338	1210	(*_blossom_data)[blossom].base = node;
deba@947	1211	(*_blossom_data)[blossom].next = INVALID;
deba@338	1212	}
deba@338	1213
deba@339	1214	void augmentOnEdge(const Edge& edge) {
deba@339	1215
deba@339	1216	int left = _blossom_set->find(_graph.u(edge));
deba@339	1217	int right = _blossom_set->find(_graph.v(edge));
deba@338	1218
deba@947	1219	int left_tree = _tree_set->find(left);
deba@947	1220	alternatePath(left, left_tree);
deba@947	1221	destroyTree(left_tree);
deba@947	1222
deba@947	1223	int right_tree = _tree_set->find(right);
deba@947	1224	alternatePath(right, right_tree);
deba@947	1225	destroyTree(right_tree);
deba@338	1226
deba@339	1227	(*_blossom_data)[left].next = _graph.direct(edge, true);
deba@339	1228	(*_blossom_data)[right].next = _graph.direct(edge, false);
deba@338	1229	}
deba@338	1230
deba@947	1231	void augmentOnArc(const Arc& arc) {
deba@947	1232
deba@947	1233	int left = _blossom_set->find(_graph.source(arc));
deba@947	1234	int right = _blossom_set->find(_graph.target(arc));
deba@947	1235
deba@947	1236	(*_blossom_data)[left].status = MATCHED;
deba@947	1237
deba@947	1238	int right_tree = _tree_set->find(right);
deba@947	1239	alternatePath(right, right_tree);
deba@947	1240	destroyTree(right_tree);
deba@947	1241
deba@947	1242	(*_blossom_data)[left].next = arc;
deba@947	1243	(*_blossom_data)[right].next = _graph.oppositeArc(arc);
deba@947	1244	}
deba@947	1245
deba@338	1246	void extendOnArc(const Arc& arc) {
deba@338	1247	int base = _blossom_set->find(_graph.target(arc));
deba@338	1248	int tree = _tree_set->find(base);
deba@338	1249
deba@338	1250	int odd = _blossom_set->find(_graph.source(arc));
deba@338	1251	_tree_set->insert(odd, tree);
deba@338	1252	(*_blossom_data)[odd].status = ODD;
deba@338	1253	matchedToOdd(odd);
deba@338	1254	(*_blossom_data)[odd].pred = arc;
deba@338	1255
deba@338	1256	int even = _blossom_set->find(_graph.target((*_blossom_data)[odd].next));
deba@338	1257	(_blossom_data)[even].pred = (_blossom_data)[even].next;
deba@338	1258	_tree_set->insert(even, tree);
deba@338	1259	(*_blossom_data)[even].status = EVEN;
deba@338	1260	matchedToEven(even, tree);
deba@338	1261	}
deba@338	1262
deba@339	1263	void shrinkOnEdge(const Edge& edge, int tree) {
deba@338	1264	int nca = -1;
deba@338	1265	std::vector<int> left_path, right_path;
deba@338	1266
deba@338	1267	{
deba@338	1268	std::set<int> left_set, right_set;
deba@338	1269	int left = _blossom_set->find(_graph.u(edge));
deba@338	1270	left_path.push_back(left);
deba@338	1271	left_set.insert(left);
deba@338	1272
deba@338	1273	int right = _blossom_set->find(_graph.v(edge));
deba@338	1274	right_path.push_back(right);
deba@338	1275	right_set.insert(right);
deba@338	1276
deba@338	1277	while (true) {
deba@338	1278
deba@338	1279	if ((*_blossom_data)[left].pred == INVALID) break;
deba@338	1280
deba@338	1281	left =
deba@338	1282	_blossom_set->find(_graph.target((*_blossom_data)[left].pred));
deba@338	1283	left_path.push_back(left);
deba@338	1284	left =
deba@338	1285	_blossom_set->find(_graph.target((*_blossom_data)[left].pred));
deba@338	1286	left_path.push_back(left);
deba@338	1287
deba@338	1288	left_set.insert(left);
deba@338	1289
deba@338	1290	if (right_set.find(left) != right_set.end()) {
deba@338	1291	nca = left;
deba@338	1292	break;
deba@338	1293	}
deba@338	1294
deba@338	1295	if ((*_blossom_data)[right].pred == INVALID) break;
deba@338	1296
deba@338	1297	right =
deba@338	1298	_blossom_set->find(_graph.target((*_blossom_data)[right].pred));
deba@338	1299	right_path.push_back(right);
deba@338	1300	right =
deba@338	1301	_blossom_set->find(_graph.target((*_blossom_data)[right].pred));
deba@338	1302	right_path.push_back(right);
deba@338	1303
deba@338	1304	right_set.insert(right);
deba@338	1305
deba@338	1306	if (left_set.find(right) != left_set.end()) {
deba@338	1307	nca = right;
deba@338	1308	break;
deba@338	1309	}
deba@338	1310
deba@338	1311	}
deba@338	1312
deba@338	1313	if (nca == -1) {
deba@338	1314	if ((*_blossom_data)[left].pred == INVALID) {
deba@338	1315	nca = right;
deba@338	1316	while (left_set.find(nca) == left_set.end()) {
deba@338	1317	nca =
deba@338	1318	_blossom_set->find(_graph.target((*_blossom_data)[nca].pred));
deba@338	1319	right_path.push_back(nca);
deba@338	1320	nca =
deba@338	1321	_blossom_set->find(_graph.target((*_blossom_data)[nca].pred));
deba@338	1322	right_path.push_back(nca);
deba@338	1323	}
deba@338	1324	} else {
deba@338	1325	nca = left;
deba@338	1326	while (right_set.find(nca) == right_set.end()) {
deba@338	1327	nca =
deba@338	1328	_blossom_set->find(_graph.target((*_blossom_data)[nca].pred));
deba@338	1329	left_path.push_back(nca);
deba@338	1330	nca =
deba@338	1331	_blossom_set->find(_graph.target((*_blossom_data)[nca].pred));
deba@338	1332	left_path.push_back(nca);
deba@338	1333	}
deba@338	1334	}
deba@338	1335	}
deba@338	1336	}
deba@338	1337
deba@338	1338	std::vector<int> subblossoms;
deba@338	1339	Arc prev;
deba@338	1340
deba@338	1341	prev = _graph.direct(edge, true);
deba@338	1342	for (int i = 0; left_path[i] != nca; i += 2) {
deba@338	1343	subblossoms.push_back(left_path[i]);
deba@338	1344	(*_blossom_data)[left_path[i]].next = prev;
deba@338	1345	_tree_set->erase(left_path[i]);
deba@338	1346
deba@338	1347	subblossoms.push_back(left_path[i + 1]);
deba@338	1348	(*_blossom_data)[left_path[i + 1]].status = EVEN;
deba@338	1349	oddToEven(left_path[i + 1], tree);
deba@338	1350	_tree_set->erase(left_path[i + 1]);
deba@338	1351	prev = _graph.oppositeArc((*_blossom_data)[left_path[i + 1]].pred);
deba@338	1352	}
deba@338	1353
deba@338	1354	int k = 0;
deba@338	1355	while (right_path[k] != nca) ++k;
deba@338	1356
deba@338	1357	subblossoms.push_back(nca);
deba@338	1358	(*_blossom_data)[nca].next = prev;
deba@338	1359
deba@338	1360	for (int i = k - 2; i >= 0; i -= 2) {
deba@338	1361	subblossoms.push_back(right_path[i + 1]);
deba@338	1362	(*_blossom_data)[right_path[i + 1]].status = EVEN;
deba@338	1363	oddToEven(right_path[i + 1], tree);
deba@338	1364	_tree_set->erase(right_path[i + 1]);
deba@338	1365
deba@338	1366	(*_blossom_data)[right_path[i + 1]].next =
deba@338	1367	(*_blossom_data)[right_path[i + 1]].pred;
deba@338	1368
deba@338	1369	subblossoms.push_back(right_path[i]);
deba@338	1370	_tree_set->erase(right_path[i]);
deba@338	1371	}
deba@338	1372
deba@338	1373	int surface =
deba@338	1374	_blossom_set->join(subblossoms.begin(), subblossoms.end());
deba@338	1375
deba@338	1376	for (int i = 0; i < int(subblossoms.size()); ++i) {
deba@338	1377	if (!_blossom_set->trivial(subblossoms[i])) {
deba@338	1378	(_blossom_data)[subblossoms[i]].pot += 2 _delta_sum;
deba@338	1379	}
deba@338	1380	(*_blossom_data)[subblossoms[i]].status = MATCHED;
deba@338	1381	}
deba@338	1382
deba@338	1383	(_blossom_data)[surface].pot = -2 _delta_sum;
deba@338	1384	(*_blossom_data)[surface].offset = 0;
deba@338	1385	(*_blossom_data)[surface].status = EVEN;
deba@338	1386	(_blossom_data)[surface].pred = (_blossom_data)[nca].pred;
deba@338	1387	(_blossom_data)[surface].next = (_blossom_data)[nca].pred;
deba@338	1388
deba@338	1389	_tree_set->insert(surface, tree);
deba@338	1390	_tree_set->erase(nca);
deba@338	1391	}
deba@338	1392
deba@338	1393	void splitBlossom(int blossom) {
deba@338	1394	Arc next = (*_blossom_data)[blossom].next;
deba@338	1395	Arc pred = (*_blossom_data)[blossom].pred;
deba@338	1396
deba@338	1397	int tree = _tree_set->find(blossom);
deba@338	1398
deba@338	1399	(*_blossom_data)[blossom].status = MATCHED;
deba@338	1400	oddToMatched(blossom);
deba@338	1401	if (_delta2->state(blossom) == _delta2->IN_HEAP) {
deba@338	1402	_delta2->erase(blossom);
deba@338	1403	}
deba@338	1404
deba@338	1405	std::vector<int> subblossoms;
deba@338	1406	_blossom_set->split(blossom, std::back_inserter(subblossoms));
deba@338	1407
deba@338	1408	Value offset = (*_blossom_data)[blossom].offset;
deba@338	1409	int b = _blossom_set->find(_graph.source(pred));
deba@338	1410	int d = _blossom_set->find(_graph.source(next));
deba@338	1411
deba@338	1412	int ib = -1, id = -1;
deba@338	1413	for (int i = 0; i < int(subblossoms.size()); ++i) {
deba@338	1414	if (subblossoms[i] == b) ib = i;
deba@338	1415	if (subblossoms[i] == d) id = i;
deba@338	1416
deba@338	1417	(*_blossom_data)[subblossoms[i]].offset = offset;
deba@338	1418	if (!_blossom_set->trivial(subblossoms[i])) {
deba@338	1419	(_blossom_data)[subblossoms[i]].pot -= 2 offset;
deba@338	1420	}
deba@338	1421	if (_blossom_set->classPrio(subblossoms[i]) !=
deba@338	1422	std::numeric_limits<Value>::max()) {
deba@338	1423	_delta2->push(subblossoms[i],
deba@338	1424	_blossom_set->classPrio(subblossoms[i]) -
deba@338	1425	(*_blossom_data)[subblossoms[i]].offset);
deba@338	1426	}
deba@338	1427	}
deba@338	1428
deba@338	1429	if (id > ib ? ((id - ib) % 2 == 0) : ((ib - id) % 2 == 1)) {
deba@338	1430	for (int i = (id + 1) % subblossoms.size();
deba@338	1431	i != ib; i = (i + 2) % subblossoms.size()) {
deba@338	1432	int sb = subblossoms[i];
deba@338	1433	int tb = subblossoms[(i + 1) % subblossoms.size()];
deba@338	1434	(*_blossom_data)[sb].next =
deba@338	1435	_graph.oppositeArc((*_blossom_data)[tb].next);
deba@338	1436	}
deba@338	1437
deba@338	1438	for (int i = ib; i != id; i = (i + 2) % subblossoms.size()) {
deba@338	1439	int sb = subblossoms[i];
deba@338	1440	int tb = subblossoms[(i + 1) % subblossoms.size()];
deba@338	1441	int ub = subblossoms[(i + 2) % subblossoms.size()];
deba@338	1442
deba@338	1443	(*_blossom_data)[sb].status = ODD;
deba@338	1444	matchedToOdd(sb);
deba@338	1445	_tree_set->insert(sb, tree);
deba@338	1446	(*_blossom_data)[sb].pred = pred;
deba@338	1447	(*_blossom_data)[sb].next =
deba@947	1448	_graph.oppositeArc((*_blossom_data)[tb].next);
deba@338	1449
deba@338	1450	pred = (*_blossom_data)[ub].next;
deba@338	1451
deba@338	1452	(*_blossom_data)[tb].status = EVEN;
deba@338	1453	matchedToEven(tb, tree);
deba@338	1454	_tree_set->insert(tb, tree);
deba@338	1455	(_blossom_data)[tb].pred = (_blossom_data)[tb].next;
deba@338	1456	}
deba@338	1457
deba@338	1458	(*_blossom_data)[subblossoms[id]].status = ODD;
deba@338	1459	matchedToOdd(subblossoms[id]);
deba@338	1460	_tree_set->insert(subblossoms[id], tree);
deba@338	1461	(*_blossom_data)[subblossoms[id]].next = next;
deba@338	1462	(*_blossom_data)[subblossoms[id]].pred = pred;
deba@338	1463
deba@338	1464	} else {
deba@338	1465
deba@338	1466	for (int i = (ib + 1) % subblossoms.size();
deba@338	1467	i != id; i = (i + 2) % subblossoms.size()) {
deba@338	1468	int sb = subblossoms[i];
deba@338	1469	int tb = subblossoms[(i + 1) % subblossoms.size()];
deba@338	1470	(*_blossom_data)[sb].next =
deba@338	1471	_graph.oppositeArc((*_blossom_data)[tb].next);
deba@338	1472	}
deba@338	1473
deba@338	1474	for (int i = id; i != ib; i = (i + 2) % subblossoms.size()) {
deba@338	1475	int sb = subblossoms[i];
deba@338	1476	int tb = subblossoms[(i + 1) % subblossoms.size()];
deba@338	1477	int ub = subblossoms[(i + 2) % subblossoms.size()];
deba@338	1478
deba@338	1479	(*_blossom_data)[sb].status = ODD;
deba@338	1480	matchedToOdd(sb);
deba@338	1481	_tree_set->insert(sb, tree);
deba@338	1482	(*_blossom_data)[sb].next = next;
deba@338	1483	(*_blossom_data)[sb].pred =
deba@338	1484	_graph.oppositeArc((*_blossom_data)[tb].next);
deba@338	1485
deba@338	1486	(*_blossom_data)[tb].status = EVEN;
deba@338	1487	matchedToEven(tb, tree);
deba@338	1488	_tree_set->insert(tb, tree);
deba@338	1489	(*_blossom_data)[tb].pred =
deba@338	1490	(*_blossom_data)[tb].next =
deba@338	1491	_graph.oppositeArc((*_blossom_data)[ub].next);
deba@338	1492	next = (*_blossom_data)[ub].next;
deba@338	1493	}
deba@338	1494
deba@338	1495	(*_blossom_data)[subblossoms[ib]].status = ODD;
deba@338	1496	matchedToOdd(subblossoms[ib]);
deba@338	1497	_tree_set->insert(subblossoms[ib], tree);
deba@338	1498	(*_blossom_data)[subblossoms[ib]].next = next;
deba@338	1499	(*_blossom_data)[subblossoms[ib]].pred = pred;
deba@338	1500	}
deba@338	1501	_tree_set->erase(blossom);
deba@338	1502	}
deba@338	1503
deba@338	1504	void extractBlossom(int blossom, const Node& base, const Arc& matching) {
deba@338	1505	if (_blossom_set->trivial(blossom)) {
deba@338	1506	int bi = (*_node_index)[base];
deba@338	1507	Value pot = (*_node_data)[bi].pot;
deba@338	1508
kpeter@628	1509	(*_matching)[base] = matching;
deba@338	1510	_blossom_node_list.push_back(base);
kpeter@628	1511	(*_node_potential)[base] = pot;
deba@338	1512	} else {
deba@338	1513
deba@338	1514	Value pot = (*_blossom_data)[blossom].pot;
deba@338	1515	int bn = _blossom_node_list.size();
deba@338	1516
deba@338	1517	std::vector<int> subblossoms;
deba@338	1518	_blossom_set->split(blossom, std::back_inserter(subblossoms));
deba@338	1519	int b = _blossom_set->find(base);
deba@338	1520	int ib = -1;
deba@338	1521	for (int i = 0; i < int(subblossoms.size()); ++i) {
deba@338	1522	if (subblossoms[i] == b) { ib = i; break; }
deba@338	1523	}
deba@338	1524
deba@338	1525	for (int i = 1; i < int(subblossoms.size()); i += 2) {
deba@338	1526	int sb = subblossoms[(ib + i) % subblossoms.size()];
deba@338	1527	int tb = subblossoms[(ib + i + 1) % subblossoms.size()];
deba@338	1528
deba@338	1529	Arc m = (*_blossom_data)[tb].next;
deba@338	1530	extractBlossom(sb, _graph.target(m), _graph.oppositeArc(m));
deba@338	1531	extractBlossom(tb, _graph.source(m), m);
deba@338	1532	}
deba@338	1533	extractBlossom(subblossoms[ib], base, matching);
deba@338	1534
deba@338	1535	int en = _blossom_node_list.size();
deba@338	1536
deba@338	1537	_blossom_potential.push_back(BlossomVariable(bn, en, pot));
deba@338	1538	}
deba@338	1539	}
deba@338	1540
deba@338	1541	void extractMatching() {
deba@338	1542	std::vector<int> blossoms;
deba@338	1543	for (typename BlossomSet::ClassIt c(*_blossom_set); c != INVALID; ++c) {
deba@338	1544	blossoms.push_back(c);
deba@338	1545	}
deba@338	1546
deba@338	1547	for (int i = 0; i < int(blossoms.size()); ++i) {
deba@947	1548	if ((*_blossom_data)[blossoms[i]].next != INVALID) {
deba@338	1549
deba@338	1550	Value offset = (*_blossom_data)[blossoms[i]].offset;
deba@338	1551	(_blossom_data)[blossoms[i]].pot += 2 offset;
deba@338	1552	for (typename BlossomSet::ItemIt n(*_blossom_set, blossoms[i]);
deba@338	1553	n != INVALID; ++n) {
deba@338	1554	(_node_data)[(_node_index)[n]].pot -= offset;
deba@338	1555	}
deba@338	1556
deba@338	1557	Arc matching = (*_blossom_data)[blossoms[i]].next;
deba@338	1558	Node base = _graph.source(matching);
deba@338	1559	extractBlossom(blossoms[i], base, matching);
deba@338	1560	} else {
deba@338	1561	Node base = (*_blossom_data)[blossoms[i]].base;
deba@338	1562	extractBlossom(blossoms[i], base, INVALID);
deba@338	1563	}
deba@338	1564	}
deba@338	1565	}
deba@338	1566
deba@338	1567	public:
deba@338	1568
deba@338	1569	/// \brief Constructor
deba@338	1570	///
deba@338	1571	/// Constructor.
deba@338	1572	MaxWeightedMatching(const Graph& graph, const WeightMap& weight)
deba@338	1573	: _graph(graph), _weight(weight), _matching(0),
deba@338	1574	_node_potential(0), _blossom_potential(), _blossom_node_list(),
deba@338	1575	_node_num(0), _blossom_num(0),
deba@338	1576
deba@338	1577	_blossom_index(0), _blossom_set(0), _blossom_data(0),
deba@338	1578	_node_index(0), _node_heap_index(0), _node_data(0),
deba@338	1579	_tree_set_index(0), _tree_set(0),
deba@338	1580
deba@338	1581	_delta1_index(0), _delta1(0),
deba@338	1582	_delta2_index(0), _delta2(0),
deba@338	1583	_delta3_index(0), _delta3(0),
deba@338	1584	_delta4_index(0), _delta4(0),
deba@338	1585
deba@949	1586	_delta_sum(), _unmatched(0),
deba@949	1587
deba@949	1588	_fractional(0)
deba@949	1589	{}
deba@338	1590
deba@338	1591	~MaxWeightedMatching() {
deba@338	1592	destroyStructures();
deba@949	1593	if (_fractional) {
deba@949	1594	delete _fractional;
deba@949	1595	}
deba@338	1596	}
deba@338	1597
kpeter@637	1598	/// \name Execution Control
alpar@342	1599	/// The simplest way to execute the algorithm is to use the
kpeter@637	1600	/// \ref run() member function.
deba@338	1601
deba@338	1602	///@{
deba@338	1603
deba@338	1604	/// \brief Initialize the algorithm
deba@338	1605	///
kpeter@637	1606	/// This function initializes the algorithm.
deba@338	1607	void init() {
deba@338	1608	createStructures();
deba@338	1609
deba@945	1610	_blossom_node_list.clear();
deba@945	1611	_blossom_potential.clear();
deba@945	1612
deba@338	1613	for (ArcIt e(_graph); e != INVALID; ++e) {
kpeter@628	1614	(*_node_heap_index)[e] = BinHeap<Value, IntArcMap>::PRE_HEAP;
deba@338	1615	}
deba@338	1616	for (NodeIt n(_graph); n != INVALID; ++n) {
kpeter@628	1617	(*_delta1_index)[n] = _delta1->PRE_HEAP;
deba@338	1618	}
deba@338	1619	for (EdgeIt e(_graph); e != INVALID; ++e) {
kpeter@628	1620	(*_delta3_index)[e] = _delta3->PRE_HEAP;
deba@338	1621	}
deba@338	1622	for (int i = 0; i < _blossom_num; ++i) {
kpeter@628	1623	(*_delta2_index)[i] = _delta2->PRE_HEAP;
kpeter@628	1624	(*_delta4_index)[i] = _delta4->PRE_HEAP;
deba@338	1625	}
deba@945	1626
deba@949	1627	_unmatched = _node_num;
deba@949	1628
deba@945	1629	_delta1->clear();
deba@945	1630	_delta2->clear();
deba@945	1631	_delta3->clear();
deba@945	1632	_delta4->clear();
deba@945	1633	_blossom_set->clear();
deba@945	1634	_tree_set->clear();
deba@338	1635
deba@338	1636	int index = 0;
deba@338	1637	for (NodeIt n(_graph); n != INVALID; ++n) {
deba@338	1638	Value max = 0;
deba@338	1639	for (OutArcIt e(_graph, n); e != INVALID; ++e) {
deba@338	1640	if (_graph.target(e) == n) continue;
deba@338	1641	if ((dualScale * _weight[e]) / 2 > max) {
deba@338	1642	max = (dualScale * _weight[e]) / 2;
deba@338	1643	}
deba@338	1644	}
kpeter@628	1645	(*_node_index)[n] = index;
deba@945	1646	(*_node_data)[index].heap_index.clear();
deba@945	1647	(*_node_data)[index].heap.clear();
deba@338	1648	(*_node_data)[index].pot = max;
deba@338	1649	_delta1->push(n, max);
deba@338	1650	int blossom =
deba@338	1651	_blossom_set->insert(n, std::numeric_limits<Value>::max());
deba@338	1652
deba@338	1653	_tree_set->insert(blossom);
deba@338	1654
deba@338	1655	(*_blossom_data)[blossom].status = EVEN;
deba@338	1656	(*_blossom_data)[blossom].pred = INVALID;
deba@338	1657	(*_blossom_data)[blossom].next = INVALID;
deba@338	1658	(*_blossom_data)[blossom].pot = 0;
deba@338	1659	(*_blossom_data)[blossom].offset = 0;
deba@338	1660	++index;
deba@338	1661	}
deba@338	1662	for (EdgeIt e(_graph); e != INVALID; ++e) {
deba@338	1663	int si = (*_node_index)[_graph.u(e)];
deba@338	1664	int ti = (*_node_index)[_graph.v(e)];
deba@338	1665	if (_graph.u(e) != _graph.v(e)) {
deba@338	1666	_delta3->push(e, ((_node_data)[si].pot + (_node_data)[ti].pot -
deba@338	1667	dualScale * _weight[e]) / 2);
deba@338	1668	}
deba@338	1669	}
deba@338	1670	}
deba@338	1671
deba@949	1672	/// \brief Initialize the algorithm with fractional matching
deba@949	1673	///
deba@949	1674	/// This function initializes the algorithm with a fractional
deba@949	1675	/// matching. This initialization is also called jumpstart heuristic.
deba@949	1676	void fractionalInit() {
deba@949	1677	createStructures();
deba@949	1678
deba@949	1679	if (_fractional == 0) {
deba@949	1680	_fractional = new FractionalMatching(_graph, _weight, false);
deba@949	1681	}
deba@949	1682	_fractional->run();
deba@949	1683
deba@949	1684	for (ArcIt e(_graph); e != INVALID; ++e) {
deba@949	1685	(*_node_heap_index)[e] = BinHeap<Value, IntArcMap>::PRE_HEAP;
deba@949	1686	}
deba@949	1687	for (NodeIt n(_graph); n != INVALID; ++n) {
deba@949	1688	(*_delta1_index)[n] = _delta1->PRE_HEAP;
deba@949	1689	}
deba@949	1690	for (EdgeIt e(_graph); e != INVALID; ++e) {
deba@949	1691	(*_delta3_index)[e] = _delta3->PRE_HEAP;
deba@949	1692	}
deba@949	1693	for (int i = 0; i < _blossom_num; ++i) {
deba@949	1694	(*_delta2_index)[i] = _delta2->PRE_HEAP;
deba@949	1695	(*_delta4_index)[i] = _delta4->PRE_HEAP;
deba@949	1696	}
deba@949	1697
deba@949	1698	_unmatched = 0;
deba@949	1699
deba@949	1700	int index = 0;
deba@949	1701	for (NodeIt n(_graph); n != INVALID; ++n) {
deba@949	1702	Value pot = _fractional->nodeValue(n);
deba@949	1703	(*_node_index)[n] = index;
deba@949	1704	(*_node_data)[index].pot = pot;
deba@949	1705	int blossom =
deba@949	1706	_blossom_set->insert(n, std::numeric_limits<Value>::max());
deba@949	1707
deba@949	1708	(*_blossom_data)[blossom].status = MATCHED;
deba@949	1709	(*_blossom_data)[blossom].pred = INVALID;
deba@949	1710	(*_blossom_data)[blossom].next = _fractional->matching(n);
deba@949	1711	if (_fractional->matching(n) == INVALID) {
deba@949	1712	(*_blossom_data)[blossom].base = n;
deba@949	1713	}
deba@949	1714	(*_blossom_data)[blossom].pot = 0;
deba@949	1715	(*_blossom_data)[blossom].offset = 0;
deba@949	1716	++index;
deba@949	1717	}
deba@949	1718
deba@949	1719	typename Graph::template NodeMap<bool> processed(_graph, false);
deba@949	1720	for (NodeIt n(_graph); n != INVALID; ++n) {
deba@949	1721	if (processed[n]) continue;
deba@949	1722	processed[n] = true;
deba@949	1723	if (_fractional->matching(n) == INVALID) continue;
deba@949	1724	int num = 1;
deba@949	1725	Node v = _graph.target(_fractional->matching(n));
deba@949	1726	while (n != v) {
deba@949	1727	processed[v] = true;
deba@949	1728	v = _graph.target(_fractional->matching(v));
deba@949	1729	++num;
deba@949	1730	}
deba@949	1731
deba@949	1732	if (num % 2 == 1) {
deba@949	1733	std::vector<int> subblossoms(num);
deba@949	1734
deba@949	1735	subblossoms[--num] = _blossom_set->find(n);
deba@949	1736	_delta1->push(n, _fractional->nodeValue(n));
deba@949	1737	v = _graph.target(_fractional->matching(n));
deba@949	1738	while (n != v) {
deba@949	1739	subblossoms[--num] = _blossom_set->find(v);
deba@949	1740	_delta1->push(v, _fractional->nodeValue(v));
deba@949	1741	v = _graph.target(_fractional->matching(v));
deba@949	1742	}
deba@949	1743
deba@949	1744	int surface =
deba@949	1745	_blossom_set->join(subblossoms.begin(), subblossoms.end());
deba@949	1746	(*_blossom_data)[surface].status = EVEN;
deba@949	1747	(*_blossom_data)[surface].pred = INVALID;
deba@949	1748	(*_blossom_data)[surface].next = INVALID;
deba@949	1749	(*_blossom_data)[surface].pot = 0;
deba@949	1750	(*_blossom_data)[surface].offset = 0;
deba@949	1751
deba@949	1752	_tree_set->insert(surface);
deba@949	1753	++_unmatched;
deba@949	1754	}
deba@949	1755	}
deba@949	1756
deba@949	1757	for (EdgeIt e(_graph); e != INVALID; ++e) {
deba@949	1758	int si = (*_node_index)[_graph.u(e)];
deba@949	1759	int sb = _blossom_set->find(_graph.u(e));
deba@949	1760	int ti = (*_node_index)[_graph.v(e)];
deba@949	1761	int tb = _blossom_set->find(_graph.v(e));
deba@949	1762	if ((*_blossom_data)[sb].status == EVEN &&
deba@949	1763	(*_blossom_data)[tb].status == EVEN && sb != tb) {
deba@949	1764	_delta3->push(e, ((_node_data)[si].pot + (_node_data)[ti].pot -
deba@949	1765	dualScale * _weight[e]) / 2);
deba@949	1766	}
deba@949	1767	}
deba@949	1768
deba@949	1769	for (NodeIt n(_graph); n != INVALID; ++n) {
deba@949	1770	int nb = _blossom_set->find(n);
deba@949	1771	if ((*_blossom_data)[nb].status != MATCHED) continue;
deba@949	1772	int ni = (*_node_index)[n];
deba@949	1773
deba@949	1774	for (OutArcIt e(_graph, n); e != INVALID; ++e) {
deba@949	1775	Node v = _graph.target(e);
deba@949	1776	int vb = _blossom_set->find(v);
deba@949	1777	int vi = (*_node_index)[v];
deba@949	1778
deba@949	1779	Value rw = (_node_data)[ni].pot + (_node_data)[vi].pot -
deba@949	1780	dualScale * _weight[e];
deba@949	1781
deba@949	1782	if ((*_blossom_data)[vb].status == EVEN) {
deba@949	1783
deba@949	1784	int vt = _tree_set->find(vb);
deba@949	1785
deba@949	1786	typename std::map<int, Arc>::iterator it =
deba@949	1787	(*_node_data)[ni].heap_index.find(vt);
deba@949	1788
deba@949	1789	if (it != (*_node_data)[ni].heap_index.end()) {
deba@949	1790	if ((*_node_data)[ni].heap[it->second] > rw) {
deba@949	1791	(*_node_data)[ni].heap.replace(it->second, e);
deba@949	1792	(*_node_data)[ni].heap.decrease(e, rw);
deba@949	1793	it->second = e;
deba@949	1794	}
deba@949	1795	} else {
deba@949	1796	(*_node_data)[ni].heap.push(e, rw);
deba@949	1797	(*_node_data)[ni].heap_index.insert(std::make_pair(vt, e));
deba@949	1798	}
deba@949	1799	}
deba@949	1800	}
deba@949	1801
deba@949	1802	if (!(*_node_data)[ni].heap.empty()) {
deba@949	1803	_blossom_set->decrease(n, (*_node_data)[ni].heap.prio());
deba@949	1804	_delta2->push(nb, _blossom_set->classPrio(nb));
deba@949	1805	}
deba@949	1806	}
deba@949	1807	}
deba@949	1808
kpeter@637	1809	/// \brief Start the algorithm
deba@338	1810	///
kpeter@637	1811	/// This function starts the algorithm.
kpeter@637	1812	///
deba@949	1813	/// \pre \ref init() or \ref fractionalInit() must be called
deba@949	1814	/// before using this function.
deba@338	1815	void start() {
deba@338	1816	enum OpType {
deba@338	1817	D1, D2, D3, D4
deba@338	1818	};
deba@338	1819
deba@949	1820	while (_unmatched > 0) {
deba@338	1821	Value d1 = !_delta1->empty() ?
deba@338	1822	_delta1->prio() : std::numeric_limits<Value>::max();
deba@338	1823
deba@338	1824	Value d2 = !_delta2->empty() ?
deba@338	1825	_delta2->prio() : std::numeric_limits<Value>::max();
deba@338	1826
deba@338	1827	Value d3 = !_delta3->empty() ?
deba@338	1828	_delta3->prio() : std::numeric_limits<Value>::max();
deba@338	1829
deba@338	1830	Value d4 = !_delta4->empty() ?
deba@338	1831	_delta4->prio() : std::numeric_limits<Value>::max();
deba@338	1832
deba@947	1833	_delta_sum = d3; OpType ot = D3;
deba@947	1834	if (d1 < _delta_sum) { _delta_sum = d1; ot = D1; }
deba@338	1835	if (d2 < _delta_sum) { _delta_sum = d2; ot = D2; }
deba@338	1836	if (d4 < _delta_sum) { _delta_sum = d4; ot = D4; }
deba@338	1837
deba@338	1838	switch (ot) {
deba@338	1839	case D1:
deba@338	1840	{
deba@338	1841	Node n = _delta1->top();
deba@338	1842	unmatchNode(n);
deba@949	1843	--_unmatched;
deba@338	1844	}
deba@338	1845	break;
deba@338	1846	case D2:
deba@338	1847	{
deba@338	1848	int blossom = _delta2->top();
deba@338	1849	Node n = _blossom_set->classTop(blossom);
deba@947	1850	Arc a = (_node_data)[(_node_index)[n]].heap.top();
deba@947	1851	if ((*_blossom_data)[blossom].next == INVALID) {
deba@947	1852	augmentOnArc(a);
deba@949	1853	--_unmatched;
deba@947	1854	} else {
deba@947	1855	extendOnArc(a);
deba@947	1856	}
deba@338	1857	}
deba@338	1858	break;
deba@338	1859	case D3:
deba@338	1860	{
deba@338	1861	Edge e = _delta3->top();
deba@338	1862
deba@338	1863	int left_blossom = _blossom_set->find(_graph.u(e));
deba@338	1864	int right_blossom = _blossom_set->find(_graph.v(e));
deba@338	1865
deba@338	1866	if (left_blossom == right_blossom) {
deba@338	1867	_delta3->pop();
deba@338	1868	} else {
deba@947	1869	int left_tree = _tree_set->find(left_blossom);
deba@947	1870	int right_tree = _tree_set->find(right_blossom);
deba@338	1871
deba@338	1872	if (left_tree == right_tree) {
deba@339	1873	shrinkOnEdge(e, left_tree);
deba@338	1874	} else {
deba@339	1875	augmentOnEdge(e);
deba@949	1876	_unmatched -= 2;
deba@338	1877	}
deba@338	1878	}
deba@338	1879	} break;
deba@338	1880	case D4:
deba@338	1881	splitBlossom(_delta4->top());
deba@338	1882	break;
deba@338	1883	}
deba@338	1884	}
deba@338	1885	extractMatching();
deba@338	1886	}
deba@338	1887
kpeter@637	1888	/// \brief Run the algorithm.
deba@338	1889	///
kpeter@637	1890	/// This method runs the \c %MaxWeightedMatching algorithm.
deba@338	1891	///
deba@338	1892	/// \note mwm.run() is just a shortcut of the following code.
deba@338	1893	/// \code
deba@949	1894	/// mwm.fractionalInit();
deba@338	1895	/// mwm.start();
deba@338	1896	/// \endcode
deba@338	1897	void run() {
deba@949	1898	fractionalInit();
deba@338	1899	start();
deba@338	1900	}
deba@338	1901
deba@338	1902	/// @}
deba@338	1903
kpeter@637	1904	/// \name Primal Solution
deba@947	1905	/// Functions to get the primal solution, i.e. the maximum weighted
kpeter@637	1906	/// matching.\n
kpeter@637	1907	/// Either \ref run() or \ref start() function should be called before
kpeter@637	1908	/// using them.
deba@338	1909
deba@338	1910	/// @{
deba@338	1911
kpeter@637	1912	/// \brief Return the weight of the matching.
deba@338	1913	///
kpeter@637	1914	/// This function returns the weight of the found matching.
kpeter@637	1915	///
kpeter@637	1916	/// \pre Either run() or start() must be called before using this function.
kpeter@640	1917	Value matchingWeight() const {
deba@338	1918	Value sum = 0;
deba@338	1919	for (NodeIt n(_graph); n != INVALID; ++n) {
deba@338	1920	if ((*_matching)[n] != INVALID) {
deba@338	1921	sum += _weight[(*_matching)[n]];
deba@338	1922	}
deba@338	1923	}
deba@947	1924	return sum / 2;
deba@338	1925	}
deba@338	1926
kpeter@637	1927	/// \brief Return the size (cardinality) of the matching.
deba@338	1928	///
kpeter@637	1929	/// This function returns the size (cardinality) of the found matching.
kpeter@637	1930	///
kpeter@637	1931	/// \pre Either run() or start() must be called before using this function.
deba@339	1932	int matchingSize() const {
deba@339	1933	int num = 0;
deba@339	1934	for (NodeIt n(_graph); n != INVALID; ++n) {
deba@339	1935	if ((*_matching)[n] != INVALID) {
deba@339	1936	++num;
deba@339	1937	}
deba@339	1938	}
deba@339	1939	return num /= 2;
deba@339	1940	}
deba@339	1941
kpeter@637	1942	/// \brief Return \c true if the given edge is in the matching.
deba@339	1943	///
deba@947	1944	/// This function returns \c true if the given edge is in the found
kpeter@637	1945	/// matching.
kpeter@637	1946	///
kpeter@637	1947	/// \pre Either run() or start() must be called before using this function.
deba@339	1948	bool matching(const Edge& edge) const {
deba@339	1949	return edge == (*_matching)[_graph.u(edge)];
deba@338	1950	}
deba@338	1951
kpeter@637	1952	/// \brief Return the matching arc (or edge) incident to the given node.
deba@338	1953	///
kpeter@637	1954	/// This function returns the matching arc (or edge) incident to the
deba@947	1955	/// given node in the found matching or \c INVALID if the node is
kpeter@637	1956	/// not covered by the matching.
kpeter@637	1957	///
kpeter@637	1958	/// \pre Either run() or start() must be called before using this function.
deba@338	1959	Arc matching(const Node& node) const {
deba@338	1960	return (*_matching)[node];
deba@338	1961	}
deba@338	1962
kpeter@640	1963	/// \brief Return a const reference to the matching map.
kpeter@640	1964	///
kpeter@640	1965	/// This function returns a const reference to a node map that stores
kpeter@640	1966	/// the matching arc (or edge) incident to each node.
kpeter@640	1967	const MatchingMap& matchingMap() const {
kpeter@640	1968	return *_matching;
kpeter@640	1969	}
kpeter@640	1970
kpeter@637	1971	/// \brief Return the mate of the given node.
deba@338	1972	///
deba@947	1973	/// This function returns the mate of the given node in the found
kpeter@637	1974	/// matching or \c INVALID if the node is not covered by the matching.
kpeter@637	1975	///
kpeter@637	1976	/// \pre Either run() or start() must be called before using this function.
deba@338	1977	Node mate(const Node& node) const {
deba@338	1978	return (*_matching)[node] != INVALID ?
deba@338	1979	_graph.target((*_matching)[node]) : INVALID;
deba@338	1980	}
deba@338	1981
deba@338	1982	/// @}
deba@338	1983
kpeter@637	1984	/// \name Dual Solution
kpeter@637	1985	/// Functions to get the dual solution.\n
kpeter@637	1986	/// Either \ref run() or \ref start() function should be called before
kpeter@637	1987	/// using them.
deba@338	1988
deba@338	1989	/// @{
deba@338	1990
kpeter@637	1991	/// \brief Return the value of the dual solution.
deba@338	1992	///
deba@947	1993	/// This function returns the value of the dual solution.
deba@947	1994	/// It should be equal to the primal value scaled by \ref dualScale
kpeter@637	1995	/// "dual scale".
kpeter@637	1996	///
kpeter@637	1997	/// \pre Either run() or start() must be called before using this function.
deba@338	1998	Value dualValue() const {
deba@338	1999	Value sum = 0;
deba@338	2000	for (NodeIt n(_graph); n != INVALID; ++n) {
deba@338	2001	sum += nodeValue(n);
deba@338	2002	}
deba@338	2003	for (int i = 0; i < blossomNum(); ++i) {
deba@338	2004	sum += blossomValue(i) * (blossomSize(i) / 2);
deba@338	2005	}
deba@338	2006	return sum;
deba@338	2007	}
deba@338	2008
kpeter@637	2009	/// \brief Return the dual value (potential) of the given node.
deba@338	2010	///
kpeter@637	2011	/// This function returns the dual value (potential) of the given node.
kpeter@637	2012	///
kpeter@637	2013	/// \pre Either run() or start() must be called before using this function.
deba@338	2014	Value nodeValue(const Node& n) const {
deba@338	2015	return (*_node_potential)[n];
deba@338	2016	}
deba@338	2017
kpeter@637	2018	/// \brief Return the number of the blossoms in the basis.
deba@338	2019	///
kpeter@637	2020	/// This function returns the number of the blossoms in the basis.
kpeter@637	2021	///
kpeter@637	2022	/// \pre Either run() or start() must be called before using this function.
deba@338	2023	/// \see BlossomIt
deba@338	2024	int blossomNum() const {
deba@338	2025	return _blossom_potential.size();
deba@338	2026	}
deba@338	2027
kpeter@637	2028	/// \brief Return the number of the nodes in the given blossom.
deba@338	2029	///
kpeter@637	2030	/// This function returns the number of the nodes in the given blossom.
kpeter@637	2031	///
kpeter@637	2032	/// \pre Either run() or start() must be called before using this function.
kpeter@637	2033	/// \see BlossomIt
deba@338	2034	int blossomSize(int k) const {
deba@338	2035	return _blossom_potential[k].end - _blossom_potential[k].begin;
deba@338	2036	}
deba@338	2037
kpeter@637	2038	/// \brief Return the dual value (ptential) of the given blossom.
deba@338	2039	///
kpeter@637	2040	/// This function returns the dual value (ptential) of the given blossom.
kpeter@637	2041	///
kpeter@637	2042	/// \pre Either run() or start() must be called before using this function.
deba@338	2043	Value blossomValue(int k) const {
deba@338	2044	return _blossom_potential[k].value;
deba@338	2045	}
deba@338	2046
kpeter@637	2047	/// \brief Iterator for obtaining the nodes of a blossom.
deba@338	2048	///
deba@947	2049	/// This class provides an iterator for obtaining the nodes of the
kpeter@637	2050	/// given blossom. It lists a subset of the nodes.
deba@947	2051	/// Before using this iterator, you must allocate a
kpeter@637	2052	/// MaxWeightedMatching class and execute it.
deba@338	2053	class BlossomIt {
deba@338	2054	public:
deba@338	2055
deba@338	2056	/// \brief Constructor.
deba@338	2057	///
kpeter@637	2058	/// Constructor to get the nodes of the given variable.
kpeter@637	2059	///
deba@947	2060	/// \pre Either \ref MaxWeightedMatching::run() "algorithm.run()" or
deba@947	2061	/// \ref MaxWeightedMatching::start() "algorithm.start()" must be
kpeter@637	2062	/// called before initializing this iterator.
deba@338	2063	BlossomIt(const MaxWeightedMatching& algorithm, int variable)
deba@338	2064	: _algorithm(&algorithm)
deba@338	2065	{
deba@338	2066	_index = _algorithm->_blossom_potential[variable].begin;
deba@338	2067	_last = _algorithm->_blossom_potential[variable].end;
deba@338	2068	}
deba@338	2069
kpeter@637	2070	/// \brief Conversion to \c Node.
deba@338	2071	///
kpeter@637	2072	/// Conversion to \c Node.
deba@338	2073	operator Node() const {
deba@339	2074	return _algorithm->_blossom_node_list[_index];
deba@338	2075	}
deba@338	2076
deba@338	2077	/// \brief Increment operator.
deba@338	2078	///
deba@338	2079	/// Increment operator.
deba@338	2080	BlossomIt& operator++() {
deba@338	2081	++_index;
deba@338	2082	return *this;
deba@338	2083	}
deba@338	2084
deba@339	2085	/// \brief Validity checking
deba@339	2086	///
deba@339	2087	/// Checks whether the iterator is invalid.
deba@339	2088	bool operator==(Invalid) const { return _index == _last; }
deba@339	2089
deba@339	2090	/// \brief Validity checking
deba@339	2091	///
deba@339	2092	/// Checks whether the iterator is valid.
deba@339	2093	bool operator!=(Invalid) const { return _index != _last; }
deba@338	2094
deba@338	2095	private:
deba@338	2096	const MaxWeightedMatching* _algorithm;
deba@338	2097	int _last;
deba@338	2098	int _index;
deba@338	2099	};
deba@338	2100
deba@338	2101	/// @}
deba@338	2102
deba@338	2103	};
deba@338	2104
deba@338	2105	/// \ingroup matching
deba@338	2106	///
deba@338	2107	/// \brief Weighted perfect matching in general graphs
deba@338	2108	///
deba@338	2109	/// This class provides an efficient implementation of Edmond's
deba@339	2110	/// maximum weighted perfect matching algorithm. The implementation
deba@338	2111	/// is based on extensive use of priority queues and provides
kpeter@606	2112	/// \f$O(nm\log n)\f$ time complexity.
deba@338	2113	///
deba@947	2114	/// The maximum weighted perfect matching problem is to find a subset of
deba@947	2115	/// the edges in an undirected graph with maximum overall weight for which
kpeter@637	2116	/// each node has exactly one incident edge.
kpeter@637	2117	/// It can be formulated with the following linear program.
deba@338	2118	/// \f[ \sum_{e \in \delta(u)}x_e = 1 \quad \forall u\in V\f]
deba@339	2119	/** \f[ \sum_{e \in \gamma(B)}x_e \le \frac{\vert B \vert - 1}{2}
deba@339	2120	\quad \forall B\in\mathcal{O}\f] */
deba@338	2121	/// \f[x_e \ge 0\quad \forall e\in E\f]
deba@338	2122	/// \f[\max \sum_{e\in E}x_ew_e\f]
deba@339	2123	/// where \f$\delta(X)\f$ is the set of edges incident to a node in
deba@339	2124	/// \f$X\f$, \f$\gamma(X)\f$ is the set of edges with both ends in
deba@339	2125	/// \f$X\f$ and \f$\mathcal{O}\f$ is the set of odd cardinality
deba@339	2126	/// subsets of the nodes.
deba@338	2127	///
deba@338	2128	/// The algorithm calculates an optimal matching and a proof of the
deba@338	2129	/// optimality. The solution of the dual problem can be used to check
deba@339	2130	/// the result of the algorithm. The dual linear problem is the
kpeter@637	2131	/// following.
deba@339	2132	/** \f[ y_u + y_v + \sum_{B \in \mathcal{O}, uv \in \gamma(B)}z_B \ge
deba@339	2133	w_{uv} \quad \forall uv\in E\f] */
deba@338	2134	/// \f[z_B \ge 0 \quad \forall B \in \mathcal{O}\f]
deba@339	2135	/** \f[\min \sum_{u \in V}y_u + \sum_{B \in \mathcal{O}}
deba@339	2136	\frac{\vert B \vert - 1}{2}z_B\f] */
deba@338	2137	///
deba@947	2138	/// The algorithm can be executed with the run() function.
kpeter@637	2139	/// After it the matching (the primal solution) and the dual solution
deba@947	2140	/// can be obtained using the query functions and the
deba@947	2141	/// \ref MaxWeightedPerfectMatching::BlossomIt "BlossomIt" nested class,
deba@947	2142	/// which is able to iterate on the nodes of a blossom.
kpeter@637	2143	/// If the value type is integer, then the dual solution is multiplied
kpeter@637	2144	/// by \ref MaxWeightedMatching::dualScale "4".
kpeter@637	2145	///
kpeter@640	2146	/// \tparam GR The undirected graph type the algorithm runs on.
deba@947	2147	/// \tparam WM The type edge weight map. The default type is
kpeter@637	2148	/// \ref concepts::Graph::EdgeMap "GR::EdgeMap<int>".
kpeter@637	2149	#ifdef DOXYGEN
kpeter@637	2150	template <typename GR, typename WM>
kpeter@637	2151	#else
kpeter@606	2152	template <typename GR,
kpeter@606	2153	typename WM = typename GR::template EdgeMap<int> >
kpeter@637	2154	#endif
deba@338	2155	class MaxWeightedPerfectMatching {
deba@338	2156	public:
deba@338	2157
kpeter@637	2158	/// The graph type of the algorithm
kpeter@606	2159	typedef GR Graph;
kpeter@637	2160	/// The type of the edge weight map
kpeter@606	2161	typedef WM WeightMap;
kpeter@637	2162	/// The value type of the edge weights
deba@338	2163	typedef typename WeightMap::Value Value;
deba@338	2164
deba@338	2165	/// \brief Scaling factor for dual solution
deba@338	2166	///
deba@338	2167	/// Scaling factor for dual solution, it is equal to 4 or 1
deba@338	2168	/// according to the value type.
deba@338	2169	static const int dualScale =
deba@338	2170	std::numeric_limits<Value>::is_integer ? 4 : 1;
deba@338	2171
kpeter@640	2172	/// The type of the matching map
deba@338	2173	typedef typename Graph::template NodeMap<typename Graph::Arc>
deba@338	2174	MatchingMap;
deba@338	2175
deba@338	2176	private:
deba@338	2177
deba@338	2178	TEMPLATE_GRAPH_TYPEDEFS(Graph);
deba@338	2179
deba@338	2180	typedef typename Graph::template NodeMap<Value> NodePotential;
deba@338	2181	typedef std::vector<Node> BlossomNodeList;
deba@338	2182
deba@338	2183	struct BlossomVariable {
deba@338	2184	int begin, end;
deba@338	2185	Value value;
deba@338	2186
deba@338	2187	BlossomVariable(int _begin, int _end, Value _value)
deba@338	2188	: begin(_begin), end(_end), value(_value) {}
deba@338	2189
deba@338	2190	};
deba@338	2191
deba@338	2192	typedef std::vector<BlossomVariable> BlossomPotential;
deba@338	2193
deba@338	2194	const Graph& _graph;
deba@338	2195	const WeightMap& _weight;
deba@338	2196
deba@338	2197	MatchingMap* _matching;
deba@338	2198
deba@338	2199	NodePotential* _node_potential;
deba@338	2200
deba@338	2201	BlossomPotential _blossom_potential;
deba@338	2202	BlossomNodeList _blossom_node_list;
deba@338	2203
deba@338	2204	int _node_num;
deba@338	2205	int _blossom_num;
deba@338	2206
deba@338	2207	typedef RangeMap<int> IntIntMap;
deba@338	2208
deba@338	2209	enum Status {
deba@338	2210	EVEN = -1, MATCHED = 0, ODD = 1
deba@338	2211	};
deba@338	2212
deba@339	2213	typedef HeapUnionFind<Value, IntNodeMap> BlossomSet;
deba@338	2214	struct BlossomData {
deba@338	2215	int tree;
deba@338	2216	Status status;
deba@338	2217	Arc pred, next;
deba@338	2218	Value pot, offset;
deba@338	2219	};
deba@338	2220
deba@339	2221	IntNodeMap *_blossom_index;
deba@338	2222	BlossomSet *_blossom_set;
deba@338	2223	RangeMap<BlossomData>* _blossom_data;
deba@338	2224
deba@339	2225	IntNodeMap *_node_index;
deba@339	2226	IntArcMap *_node_heap_index;
deba@338	2227
deba@338	2228	struct NodeData {
deba@338	2229
deba@339	2230	NodeData(IntArcMap& node_heap_index)
deba@338	2231	: heap(node_heap_index) {}
deba@338	2232
deba@338	2233	int blossom;
deba@338	2234	Value pot;
deba@339	2235	BinHeap<Value, IntArcMap> heap;
deba@338	2236	std::map<int, Arc> heap_index;
deba@338	2237
deba@338	2238	int tree;
deba@338	2239	};
deba@338	2240
deba@338	2241	RangeMap<NodeData>* _node_data;
deba@338	2242
deba@338	2243	typedef ExtendFindEnum<IntIntMap> TreeSet;
deba@338	2244
deba@338	2245	IntIntMap *_tree_set_index;
deba@338	2246	TreeSet *_tree_set;
deba@338	2247
deba@338	2248	IntIntMap *_delta2_index;
deba@338	2249	BinHeap<Value, IntIntMap> *_delta2;
deba@338	2250
deba@339	2251	IntEdgeMap *_delta3_index;
deba@339	2252	BinHeap<Value, IntEdgeMap> *_delta3;
deba@338	2253
deba@338	2254	IntIntMap *_delta4_index;
deba@338	2255	BinHeap<Value, IntIntMap> *_delta4;
deba@338	2256
deba@338	2257	Value _delta_sum;
deba@949	2258	int _unmatched;
deba@949	2259
deba@949	2260	typedef MaxWeightedPerfectFractionalMatching<Graph, WeightMap>
deba@949	2261	FractionalMatching;
deba@949	2262	FractionalMatching *_fractional;
deba@338	2263
deba@338	2264	void createStructures() {
deba@338	2265	_node_num = countNodes(_graph);
deba@338	2266	_blossom_num = _node_num * 3 / 2;
deba@338	2267
deba@338	2268	if (!_matching) {
deba@338	2269	_matching = new MatchingMap(_graph);
deba@338	2270	}
deba@945	2271
deba@338	2272	if (!_node_potential) {
deba@338	2273	_node_potential = new NodePotential(_graph);
deba@338	2274	}
deba@945	2275
deba@338	2276	if (!_blossom_set) {
deba@339	2277	_blossom_index = new IntNodeMap(_graph);
deba@338	2278	_blossom_set = new BlossomSet(*_blossom_index);
deba@338	2279	_blossom_data = new RangeMap<BlossomData>(_blossom_num);
deba@945	2280	} else if (_blossom_data->size() != _blossom_num) {
deba@945	2281	delete _blossom_data;
deba@945	2282	_blossom_data = new RangeMap<BlossomData>(_blossom_num);
deba@338	2283	}
deba@338	2284
deba@338	2285	if (!_node_index) {
deba@339	2286	_node_index = new IntNodeMap(_graph);
deba@339	2287	_node_heap_index = new IntArcMap(_graph);
deba@338	2288	_node_data = new RangeMap<NodeData>(_node_num,
deba@339	2289	NodeData(*_node_heap_index));
deba@945	2290	} else if (_node_data->size() != _node_num) {
deba@945	2291	delete _node_data;
deba@945	2292	_node_data = new RangeMap<NodeData>(_node_num,
deba@945	2293	NodeData(*_node_heap_index));
deba@338	2294	}
deba@338	2295
deba@338	2296	if (!_tree_set) {
deba@338	2297	_tree_set_index = new IntIntMap(_blossom_num);
deba@338	2298	_tree_set = new TreeSet(*_tree_set_index);
deba@945	2299	} else {
deba@945	2300	_tree_set_index->resize(_blossom_num);
deba@338	2301	}
deba@945	2302
deba@338	2303	if (!_delta2) {
deba@338	2304	_delta2_index = new IntIntMap(_blossom_num);
deba@338	2305	_delta2 = new BinHeap<Value, IntIntMap>(*_delta2_index);
deba@945	2306	} else {
deba@945	2307	_delta2_index->resize(_blossom_num);
deba@338	2308	}
deba@945	2309
deba@338	2310	if (!_delta3) {
deba@339	2311	_delta3_index = new IntEdgeMap(_graph);
deba@339	2312	_delta3 = new BinHeap<Value, IntEdgeMap>(*_delta3_index);
deba@338	2313	}
deba@945	2314
deba@338	2315	if (!_delta4) {
deba@338	2316	_delta4_index = new IntIntMap(_blossom_num);
deba@338	2317	_delta4 = new BinHeap<Value, IntIntMap>(*_delta4_index);
deba@945	2318	} else {
deba@945	2319	_delta4_index->resize(_blossom_num);
deba@338	2320	}
deba@338	2321	}
deba@338	2322
deba@338	2323	void destroyStructures() {
deba@338	2324	if (_matching) {
deba@338	2325	delete _matching;
deba@338	2326	}
deba@338	2327	if (_node_potential) {
deba@338	2328	delete _node_potential;
deba@338	2329	}
deba@338	2330	if (_blossom_set) {
deba@338	2331	delete _blossom_index;
deba@338	2332	delete _blossom_set;
deba@338	2333	delete _blossom_data;
deba@338	2334	}
deba@338	2335
deba@338	2336	if (_node_index) {
deba@338	2337	delete _node_index;
deba@338	2338	delete _node_heap_index;
deba@338	2339	delete _node_data;
deba@338	2340	}
deba@338	2341
deba@338	2342	if (_tree_set) {
deba@338	2343	delete _tree_set_index;
deba@338	2344	delete _tree_set;
deba@338	2345	}
deba@338	2346	if (_delta2) {
deba@338	2347	delete _delta2_index;
deba@338	2348	delete _delta2;
deba@338	2349	}
deba@338	2350	if (_delta3) {
deba@338	2351	delete _delta3_index;
deba@338	2352	delete _delta3;
deba@338	2353	}
deba@338	2354	if (_delta4) {
deba@338	2355	delete _delta4_index;
deba@338	2356	delete _delta4;
deba@338	2357	}
deba@338	2358	}
deba@338	2359
deba@338	2360	void matchedToEven(int blossom, int tree) {
deba@338	2361	if (_delta2->state(blossom) == _delta2->IN_HEAP) {
deba@338	2362	_delta2->erase(blossom);
deba@338	2363	}
deba@338	2364
deba@338	2365	if (!_blossom_set->trivial(blossom)) {
deba@338	2366	(*_blossom_data)[blossom].pot -=
deba@338	2367	2 * (_delta_sum - (*_blossom_data)[blossom].offset);
deba@338	2368	}
deba@338	2369
deba@338	2370	for (typename BlossomSet::ItemIt n(*_blossom_set, blossom);
deba@338	2371	n != INVALID; ++n) {
deba@338	2372
deba@338	2373	_blossom_set->increase(n, std::numeric_limits<Value>::max());
deba@338	2374	int ni = (*_node_index)[n];
deba@338	2375
deba@338	2376	(*_node_data)[ni].heap.clear();
deba@338	2377	(*_node_data)[ni].heap_index.clear();
deba@338	2378
deba@338	2379	(_node_data)[ni].pot += _delta_sum - (_blossom_data)[blossom].offset;
deba@338	2380
deba@338	2381	for (InArcIt e(_graph, n); e != INVALID; ++e) {
deba@338	2382	Node v = _graph.source(e);
deba@338	2383	int vb = _blossom_set->find(v);
deba@338	2384	int vi = (*_node_index)[v];
deba@338	2385
deba@338	2386	Value rw = (_node_data)[ni].pot + (_node_data)[vi].pot -
deba@338	2387	dualScale * _weight[e];
deba@338	2388
deba@338	2389	if ((*_blossom_data)[vb].status == EVEN) {
deba@338	2390	if (_delta3->state(e) != _delta3->IN_HEAP && blossom != vb) {
deba@338	2391	_delta3->push(e, rw / 2);
deba@338	2392	}
deba@338	2393	} else {
deba@338	2394	typename std::map<int, Arc>::iterator it =
deba@338	2395	(*_node_data)[vi].heap_index.find(tree);
deba@338	2396
deba@338	2397	if (it != (*_node_data)[vi].heap_index.end()) {
deba@338	2398	if ((*_node_data)[vi].heap[it->second] > rw) {
deba@338	2399	(*_node_data)[vi].heap.replace(it->second, e);
deba@338	2400	(*_node_data)[vi].heap.decrease(e, rw);
deba@338	2401	it->second = e;
deba@338	2402	}
deba@338	2403	} else {
deba@338	2404	(*_node_data)[vi].heap.push(e, rw);
deba@338	2405	(*_node_data)[vi].heap_index.insert(std::make_pair(tree, e));
deba@338	2406	}
deba@338	2407
deba@338	2408	if ((_blossom_set)[v] > (_node_data)[vi].heap.prio()) {
deba@338	2409	_blossom_set->decrease(v, (*_node_data)[vi].heap.prio());
deba@338	2410
deba@338	2411	if ((*_blossom_data)[vb].status == MATCHED) {
deba@338	2412	if (_delta2->state(vb) != _delta2->IN_HEAP) {
deba@338	2413	_delta2->push(vb, _blossom_set->classPrio(vb) -
deba@338	2414	(*_blossom_data)[vb].offset);
deba@338	2415	} else if ((*_delta2)[vb] > _blossom_set->classPrio(vb) -
deba@338	2416	(*_blossom_data)[vb].offset){
deba@338	2417	_delta2->decrease(vb, _blossom_set->classPrio(vb) -
deba@338	2418	(*_blossom_data)[vb].offset);
deba@338	2419	}
deba@338	2420	}
deba@338	2421	}
deba@338	2422	}
deba@338	2423	}
deba@338	2424	}
deba@338	2425	(*_blossom_data)[blossom].offset = 0;
deba@338	2426	}
deba@338	2427
deba@338	2428	void matchedToOdd(int blossom) {
deba@338	2429	if (_delta2->state(blossom) == _delta2->IN_HEAP) {
deba@338	2430	_delta2->erase(blossom);
deba@338	2431	}
deba@338	2432	(*_blossom_data)[blossom].offset += _delta_sum;
deba@338	2433	if (!_blossom_set->trivial(blossom)) {
deba@338	2434	_delta4->push(blossom, (*_blossom_data)[blossom].pot / 2 +
deba@338	2435	(*_blossom_data)[blossom].offset);
deba@338	2436	}
deba@338	2437	}
deba@338	2438
deba@338	2439	void evenToMatched(int blossom, int tree) {
deba@338	2440	if (!_blossom_set->trivial(blossom)) {
deba@338	2441	(_blossom_data)[blossom].pot += 2 _delta_sum;
deba@338	2442	}
deba@338	2443
deba@338	2444	for (typename BlossomSet::ItemIt n(*_blossom_set, blossom);
deba@338	2445	n != INVALID; ++n) {
deba@338	2446	int ni = (*_node_index)[n];
deba@338	2447	(*_node_data)[ni].pot -= _delta_sum;
deba@338	2448
deba@338	2449	for (InArcIt e(_graph, n); e != INVALID; ++e) {
deba@338	2450	Node v = _graph.source(e);
deba@338	2451	int vb = _blossom_set->find(v);
deba@338	2452	int vi = (*_node_index)[v];
deba@338	2453
deba@338	2454	Value rw = (_node_data)[ni].pot + (_node_data)[vi].pot -
deba@338	2455	dualScale * _weight[e];
deba@338	2456
deba@338	2457	if (vb == blossom) {
deba@338	2458	if (_delta3->state(e) == _delta3->IN_HEAP) {
deba@338	2459	_delta3->erase(e);
deba@338	2460	}
deba@338	2461	} else if ((*_blossom_data)[vb].status == EVEN) {
deba@338	2462
deba@338	2463	if (_delta3->state(e) == _delta3->IN_HEAP) {
deba@338	2464	_delta3->erase(e);
deba@338	2465	}
deba@338	2466
deba@338	2467	int vt = _tree_set->find(vb);
deba@338	2468
deba@338	2469	if (vt != tree) {
deba@338	2470
deba@338	2471	Arc r = _graph.oppositeArc(e);
deba@338	2472
deba@338	2473	typename std::map<int, Arc>::iterator it =
deba@338	2474	(*_node_data)[ni].heap_index.find(vt);
deba@338	2475
deba@338	2476	if (it != (*_node_data)[ni].heap_index.end()) {
deba@338	2477	if ((*_node_data)[ni].heap[it->second] > rw) {
deba@338	2478	(*_node_data)[ni].heap.replace(it->second, r);
deba@338	2479	(*_node_data)[ni].heap.decrease(r, rw);
deba@338	2480	it->second = r;
deba@338	2481	}
deba@338	2482	} else {
deba@338	2483	(*_node_data)[ni].heap.push(r, rw);
deba@338	2484	(*_node_data)[ni].heap_index.insert(std::make_pair(vt, r));
deba@338	2485	}
deba@338	2486
deba@338	2487	if ((_blossom_set)[n] > (_node_data)[ni].heap.prio()) {
deba@338	2488	_blossom_set->decrease(n, (*_node_data)[ni].heap.prio());
deba@338	2489
deba@338	2490	if (_delta2->state(blossom) != _delta2->IN_HEAP) {
deba@338	2491	_delta2->push(blossom, _blossom_set->classPrio(blossom) -
deba@338	2492	(*_blossom_data)[blossom].offset);
deba@338	2493	} else if ((*_delta2)[blossom] >
deba@338	2494	_blossom_set->classPrio(blossom) -
deba@338	2495	(*_blossom_data)[blossom].offset){
deba@338	2496	_delta2->decrease(blossom, _blossom_set->classPrio(blossom) -
deba@338	2497	(*_blossom_data)[blossom].offset);
deba@338	2498	}
deba@338	2499	}
deba@338	2500	}
deba@338	2501	} else {
deba@338	2502
deba@338	2503	typename std::map<int, Arc>::iterator it =
deba@338	2504	(*_node_data)[vi].heap_index.find(tree);
deba@338	2505
deba@338	2506	if (it != (*_node_data)[vi].heap_index.end()) {
deba@338	2507	(*_node_data)[vi].heap.erase(it->second);
deba@338	2508	(*_node_data)[vi].heap_index.erase(it);
deba@338	2509	if ((*_node_data)[vi].heap.empty()) {
deba@338	2510	_blossom_set->increase(v, std::numeric_limits<Value>::max());
deba@338	2511	} else if ((_blossom_set)[v] < (_node_data)[vi].heap.prio()) {
deba@338	2512	_blossom_set->increase(v, (*_node_data)[vi].heap.prio());
deba@338	2513	}
deba@338	2514
deba@338	2515	if ((*_blossom_data)[vb].status == MATCHED) {
deba@338	2516	if (_blossom_set->classPrio(vb) ==
deba@338	2517	std::numeric_limits<Value>::max()) {
deba@338	2518	_delta2->erase(vb);
deba@338	2519	} else if ((*_delta2)[vb] < _blossom_set->classPrio(vb) -
deba@338	2520	(*_blossom_data)[vb].offset) {
deba@338	2521	_delta2->increase(vb, _blossom_set->classPrio(vb) -
deba@338	2522	(*_blossom_data)[vb].offset);
deba@338	2523	}
deba@338	2524	}
deba@338	2525	}
deba@338	2526	}
deba@338	2527	}
deba@338	2528	}
deba@338	2529	}
deba@338	2530
deba@338	2531	void oddToMatched(int blossom) {
deba@338	2532	(*_blossom_data)[blossom].offset -= _delta_sum;
deba@338	2533
deba@338	2534	if (_blossom_set->classPrio(blossom) !=
deba@338	2535	std::numeric_limits<Value>::max()) {
deba@338	2536	_delta2->push(blossom, _blossom_set->classPrio(blossom) -
deba@338	2537	(*_blossom_data)[blossom].offset);
deba@338	2538	}
deba@338	2539
deba@338	2540	if (!_blossom_set->trivial(blossom)) {
deba@338	2541	_delta4->erase(blossom);
deba@338	2542	}
deba@338	2543	}
deba@338	2544
deba@338	2545	void oddToEven(int blossom, int tree) {
deba@338	2546	if (!_blossom_set->trivial(blossom)) {
deba@338	2547	_delta4->erase(blossom);
deba@338	2548	(*_blossom_data)[blossom].pot -=
deba@338	2549	2 * (2 * _delta_sum - (*_blossom_data)[blossom].offset);
deba@338	2550	}
deba@338	2551
deba@338	2552	for (typename BlossomSet::ItemIt n(*_blossom_set, blossom);
deba@338	2553	n != INVALID; ++n) {
deba@338	2554	int ni = (*_node_index)[n];
deba@338	2555
deba@338	2556	_blossom_set->increase(n, std::numeric_limits<Value>::max());
deba@338	2557
deba@338	2558	(*_node_data)[ni].heap.clear();
deba@338	2559	(*_node_data)[ni].heap_index.clear();
deba@338	2560	(*_node_data)[ni].pot +=
deba@338	2561	2 * _delta_sum - (*_blossom_data)[blossom].offset;
deba@338	2562
deba@338	2563	for (InArcIt e(_graph, n); e != INVALID; ++e) {
deba@338	2564	Node v = _graph.source(e);
deba@338	2565	int vb = _blossom_set->find(v);
deba@338	2566	int vi = (*_node_index)[v];
deba@338	2567
deba@338	2568	Value rw = (_node_data)[ni].pot + (_node_data)[vi].pot -
deba@338	2569	dualScale * _weight[e];
deba@338	2570
deba@338	2571	if ((*_blossom_data)[vb].status == EVEN) {
deba@338	2572	if (_delta3->state(e) != _delta3->IN_HEAP && blossom != vb) {
deba@338	2573	_delta3->push(e, rw / 2);
deba@338	2574	}
deba@338	2575	} else {
deba@338	2576
deba@338	2577	typename std::map<int, Arc>::iterator it =
deba@338	2578	(*_node_data)[vi].heap_index.find(tree);
deba@338	2579
deba@338	2580	if (it != (*_node_data)[vi].heap_index.end()) {
deba@338	2581	if ((*_node_data)[vi].heap[it->second] > rw) {
deba@338	2582	(*_node_data)[vi].heap.replace(it->second, e);
deba@338	2583	(*_node_data)[vi].heap.decrease(e, rw);
deba@338	2584	it->second = e;
deba@338	2585	}
deba@338	2586	} else {
deba@338	2587	(*_node_data)[vi].heap.push(e, rw);
deba@338	2588	(*_node_data)[vi].heap_index.insert(std::make_pair(tree, e));
deba@338	2589	}
deba@338	2590
deba@338	2591	if ((_blossom_set)[v] > (_node_data)[vi].heap.prio()) {
deba@338	2592	_blossom_set->decrease(v, (*_node_data)[vi].heap.prio());
deba@338	2593
deba@338	2594	if ((*_blossom_data)[vb].status == MATCHED) {
deba@338	2595	if (_delta2->state(vb) != _delta2->IN_HEAP) {
deba@338	2596	_delta2->push(vb, _blossom_set->classPrio(vb) -
deba@338	2597	(*_blossom_data)[vb].offset);
deba@338	2598	} else if ((*_delta2)[vb] > _blossom_set->classPrio(vb) -
deba@338	2599	(*_blossom_data)[vb].offset) {
deba@338	2600	_delta2->decrease(vb, _blossom_set->classPrio(vb) -
deba@338	2601	(*_blossom_data)[vb].offset);
deba@338	2602	}
deba@338	2603	}
deba@338	2604	}
deba@338	2605	}
deba@338	2606	}
deba@338	2607	}
deba@338	2608	(*_blossom_data)[blossom].offset = 0;
deba@338	2609	}
deba@338	2610
deba@338	2611	void alternatePath(int even, int tree) {
deba@338	2612	int odd;
deba@338	2613
deba@338	2614	evenToMatched(even, tree);
deba@338	2615	(*_blossom_data)[even].status = MATCHED;
deba@338	2616
deba@338	2617	while ((*_blossom_data)[even].pred != INVALID) {
deba@338	2618	odd = _blossom_set->find(_graph.target((*_blossom_data)[even].pred));
deba@338	2619	(*_blossom_data)[odd].status = MATCHED;
deba@338	2620	oddToMatched(odd);
deba@338	2621	(_blossom_data)[odd].next = (_blossom_data)[odd].pred;
deba@338	2622
deba@338	2623	even = _blossom_set->find(_graph.target((*_blossom_data)[odd].pred));
deba@338	2624	(*_blossom_data)[even].status = MATCHED;
deba@338	2625	evenToMatched(even, tree);
deba@338	2626	(*_blossom_data)[even].next =
deba@338	2627	_graph.oppositeArc((*_blossom_data)[odd].pred);
deba@338	2628	}
deba@338	2629
deba@338	2630	}
deba@338	2631
deba@338	2632	void destroyTree(int tree) {
deba@338	2633	for (TreeSet::ItemIt b(*_tree_set, tree); b != INVALID; ++b) {
deba@338	2634	if ((*_blossom_data)[b].status == EVEN) {
deba@338	2635	(*_blossom_data)[b].status = MATCHED;
deba@338	2636	evenToMatched(b, tree);
deba@338	2637	} else if ((*_blossom_data)[b].status == ODD) {
deba@338	2638	(*_blossom_data)[b].status = MATCHED;
deba@338	2639	oddToMatched(b);
deba@338	2640	}
deba@338	2641	}
deba@338	2642	_tree_set->eraseClass(tree);
deba@338	2643	}
deba@338	2644
deba@339	2645	void augmentOnEdge(const Edge& edge) {
deba@339	2646
deba@339	2647	int left = _blossom_set->find(_graph.u(edge));
deba@339	2648	int right = _blossom_set->find(_graph.v(edge));
deba@338	2649
deba@338	2650	int left_tree = _tree_set->find(left);
deba@338	2651	alternatePath(left, left_tree);
deba@338	2652	destroyTree(left_tree);
deba@338	2653
deba@338	2654	int right_tree = _tree_set->find(right);
deba@338	2655	alternatePath(right, right_tree);
deba@338	2656	destroyTree(right_tree);
deba@338	2657
deba@339	2658	(*_blossom_data)[left].next = _graph.direct(edge, true);
deba@339	2659	(*_blossom_data)[right].next = _graph.direct(edge, false);
deba@338	2660	}
deba@338	2661
deba@338	2662	void extendOnArc(const Arc& arc) {
deba@338	2663	int base = _blossom_set->find(_graph.target(arc));
deba@338	2664	int tree = _tree_set->find(base);
deba@338	2665
deba@338	2666	int odd = _blossom_set->find(_graph.source(arc));
deba@338	2667	_tree_set->insert(odd, tree);
deba@338	2668	(*_blossom_data)[odd].status = ODD;
deba@338	2669	matchedToOdd(odd);
deba@338	2670	(*_blossom_data)[odd].pred = arc;
deba@338	2671
deba@338	2672	int even = _blossom_set->find(_graph.target((*_blossom_data)[odd].next));
deba@338	2673	(_blossom_data)[even].pred = (_blossom_data)[even].next;
deba@338	2674	_tree_set->insert(even, tree);
deba@338	2675	(*_blossom_data)[even].status = EVEN;
deba@338	2676	matchedToEven(even, tree);
deba@338	2677	}
deba@338	2678
deba@339	2679	void shrinkOnEdge(const Edge& edge, int tree) {
deba@338	2680	int nca = -1;
deba@338	2681	std::vector<int> left_path, right_path;
deba@338	2682
deba@338	2683	{
deba@338	2684	std::set<int> left_set, right_set;
deba@338	2685	int left = _blossom_set->find(_graph.u(edge));
deba@338	2686	left_path.push_back(left);
deba@338	2687	left_set.insert(left);
deba@338	2688
deba@338	2689	int right = _blossom_set->find(_graph.v(edge));
deba@338	2690	right_path.push_back(right);
deba@338	2691	right_set.insert(right);
deba@338	2692
deba@338	2693	while (true) {
deba@338	2694
deba@338	2695	if ((*_blossom_data)[left].pred == INVALID) break;
deba@338	2696
deba@338	2697	left =
deba@338	2698	_blossom_set->find(_graph.target((*_blossom_data)[left].pred));
deba@338	2699	left_path.push_back(left);
deba@338	2700	left =
deba@338	2701	_blossom_set->find(_graph.target((*_blossom_data)[left].pred));
deba@338	2702	left_path.push_back(left);
deba@338	2703
deba@338	2704	left_set.insert(left);
deba@338	2705
deba@338	2706	if (right_set.find(left) != right_set.end()) {
deba@338	2707	nca = left;
deba@338	2708	break;
deba@338	2709	}
deba@338	2710
deba@338	2711	if ((*_blossom_data)[right].pred == INVALID) break;
deba@338	2712
deba@338	2713	right =
deba@338	2714	_blossom_set->find(_graph.target((*_blossom_data)[right].pred));
deba@338	2715	right_path.push_back(right);
deba@338	2716	right =
deba@338	2717	_blossom_set->find(_graph.target((*_blossom_data)[right].pred));
deba@338	2718	right_path.push_back(right);
deba@338	2719
deba@338	2720	right_set.insert(right);
deba@338	2721
deba@338	2722	if (left_set.find(right) != left_set.end()) {
deba@338	2723	nca = right;
deba@338	2724	break;
deba@338	2725	}
deba@338	2726
deba@338	2727	}
deba@338	2728
deba@338	2729	if (nca == -1) {
deba@338	2730	if ((*_blossom_data)[left].pred == INVALID) {
deba@338	2731	nca = right;
deba@338	2732	while (left_set.find(nca) == left_set.end()) {
deba@338	2733	nca =
deba@338	2734	_blossom_set->find(_graph.target((*_blossom_data)[nca].pred));
deba@338	2735	right_path.push_back(nca);
deba@338	2736	nca =
deba@338	2737	_blossom_set->find(_graph.target((*_blossom_data)[nca].pred));
deba@338	2738	right_path.push_back(nca);
deba@338	2739	}
deba@338	2740	} else {
deba@338	2741	nca = left;
deba@338	2742	while (right_set.find(nca) == right_set.end()) {
deba@338	2743	nca =
deba@338	2744	_blossom_set->find(_graph.target((*_blossom_data)[nca].pred));
deba@338	2745	left_path.push_back(nca);
deba@338	2746	nca =
deba@338	2747	_blossom_set->find(_graph.target((*_blossom_data)[nca].pred));
deba@338	2748	left_path.push_back(nca);
deba@338	2749	}
deba@338	2750	}
deba@338	2751	}
deba@338	2752	}
deba@338	2753
deba@338	2754	std::vector<int> subblossoms;
deba@338	2755	Arc prev;
deba@338	2756
deba@338	2757	prev = _graph.direct(edge, true);
deba@338	2758	for (int i = 0; left_path[i] != nca; i += 2) {
deba@338	2759	subblossoms.push_back(left_path[i]);
deba@338	2760	(*_blossom_data)[left_path[i]].next = prev;
deba@338	2761	_tree_set->erase(left_path[i]);
deba@338	2762
deba@338	2763	subblossoms.push_back(left_path[i + 1]);
deba@338	2764	(*_blossom_data)[left_path[i + 1]].status = EVEN;
deba@338	2765	oddToEven(left_path[i + 1], tree);
deba@338	2766	_tree_set->erase(left_path[i + 1]);
deba@338	2767	prev = _graph.oppositeArc((*_blossom_data)[left_path[i + 1]].pred);
deba@338	2768	}
deba@338	2769
deba@338	2770	int k = 0;
deba@338	2771	while (right_path[k] != nca) ++k;
deba@338	2772
deba@338	2773	subblossoms.push_back(nca);
deba@338	2774	(*_blossom_data)[nca].next = prev;
deba@338	2775
deba@338	2776	for (int i = k - 2; i >= 0; i -= 2) {
deba@338	2777	subblossoms.push_back(right_path[i + 1]);
deba@338	2778	(*_blossom_data)[right_path[i + 1]].status = EVEN;
deba@338	2779	oddToEven(right_path[i + 1], tree);
deba@338	2780	_tree_set->erase(right_path[i + 1]);
deba@338	2781
deba@338	2782	(*_blossom_data)[right_path[i + 1]].next =
deba@338	2783	(*_blossom_data)[right_path[i + 1]].pred;
deba@338	2784
deba@338	2785	subblossoms.push_back(right_path[i]);
deba@338	2786	_tree_set->erase(right_path[i]);
deba@338	2787	}
deba@338	2788
deba@338	2789	int surface =
deba@338	2790	_blossom_set->join(subblossoms.begin(), subblossoms.end());
deba@338	2791
deba@338	2792	for (int i = 0; i < int(subblossoms.size()); ++i) {
deba@338	2793	if (!_blossom_set->trivial(subblossoms[i])) {
deba@338	2794	(_blossom_data)[subblossoms[i]].pot += 2 _delta_sum;
deba@338	2795	}
deba@338	2796	(*_blossom_data)[subblossoms[i]].status = MATCHED;
deba@338	2797	}
deba@338	2798
deba@338	2799	(_blossom_data)[surface].pot = -2 _delta_sum;
deba@338	2800	(*_blossom_data)[surface].offset = 0;
deba@338	2801	(*_blossom_data)[surface].status = EVEN;
deba@338	2802	(_blossom_data)[surface].pred = (_blossom_data)[nca].pred;
deba@338	2803	(_blossom_data)[surface].next = (_blossom_data)[nca].pred;
deba@338	2804
deba@338	2805	_tree_set->insert(surface, tree);
deba@338	2806	_tree_set->erase(nca);
deba@338	2807	}
deba@338	2808
deba@338	2809	void splitBlossom(int blossom) {
deba@338	2810	Arc next = (*_blossom_data)[blossom].next;
deba@338	2811	Arc pred = (*_blossom_data)[blossom].pred;
deba@338	2812
deba@338	2813	int tree = _tree_set->find(blossom);
deba@338	2814
deba@338	2815	(*_blossom_data)[blossom].status = MATCHED;
deba@338	2816	oddToMatched(blossom);
deba@338	2817	if (_delta2->state(blossom) == _delta2->IN_HEAP) {
deba@338	2818	_delta2->erase(blossom);
deba@338	2819	}
deba@338	2820
deba@338	2821	std::vector<int> subblossoms;
deba@338	2822	_blossom_set->split(blossom, std::back_inserter(subblossoms));
deba@338	2823
deba@338	2824	Value offset = (*_blossom_data)[blossom].offset;
deba@338	2825	int b = _blossom_set->find(_graph.source(pred));
deba@338	2826	int d = _blossom_set->find(_graph.source(next));
deba@338	2827
deba@338	2828	int ib = -1, id = -1;
deba@338	2829	for (int i = 0; i < int(subblossoms.size()); ++i) {
deba@338	2830	if (subblossoms[i] == b) ib = i;
deba@338	2831	if (subblossoms[i] == d) id = i;
deba@338	2832
deba@338	2833	(*_blossom_data)[subblossoms[i]].offset = offset;
deba@338	2834	if (!_blossom_set->trivial(subblossoms[i])) {
deba@338	2835	(_blossom_data)[subblossoms[i]].pot -= 2 offset;
deba@338	2836	}
deba@338	2837	if (_blossom_set->classPrio(subblossoms[i]) !=
deba@338	2838	std::numeric_limits<Value>::max()) {
deba@338	2839	_delta2->push(subblossoms[i],
deba@338	2840	_blossom_set->classPrio(subblossoms[i]) -
deba@338	2841	(*_blossom_data)[subblossoms[i]].offset);
deba@338	2842	}
deba@338	2843	}
deba@338	2844
deba@338	2845	if (id > ib ? ((id - ib) % 2 == 0) : ((ib - id) % 2 == 1)) {
deba@338	2846	for (int i = (id + 1) % subblossoms.size();
deba@338	2847	i != ib; i = (i + 2) % subblossoms.size()) {
deba@338	2848	int sb = subblossoms[i];
deba@338	2849	int tb = subblossoms[(i + 1) % subblossoms.size()];
deba@338	2850	(*_blossom_data)[sb].next =
deba@338	2851	_graph.oppositeArc((*_blossom_data)[tb].next);
deba@338	2852	}
deba@338	2853
deba@338	2854	for (int i = ib; i != id; i = (i + 2) % subblossoms.size()) {
deba@338	2855	int sb = subblossoms[i];
deba@338	2856	int tb = subblossoms[(i + 1) % subblossoms.size()];
deba@338	2857	int ub = subblossoms[(i + 2) % subblossoms.size()];
deba@338	2858
deba@338	2859	(*_blossom_data)[sb].status = ODD;
deba@338	2860	matchedToOdd(sb);
deba@338	2861	_tree_set->insert(sb, tree);
deba@338	2862	(*_blossom_data)[sb].pred = pred;
deba@338	2863	(*_blossom_data)[sb].next =
deba@338	2864	_graph.oppositeArc((*_blossom_data)[tb].next);
deba@338	2865
deba@338	2866	pred = (*_blossom_data)[ub].next;
deba@338	2867
deba@338	2868	(*_blossom_data)[tb].status = EVEN;
deba@338	2869	matchedToEven(tb, tree);
deba@338	2870	_tree_set->insert(tb, tree);
deba@338	2871	(_blossom_data)[tb].pred = (_blossom_data)[tb].next;
deba@338	2872	}
deba@338	2873
deba@338	2874	(*_blossom_data)[subblossoms[id]].status = ODD;
deba@338	2875	matchedToOdd(subblossoms[id]);
deba@338	2876	_tree_set->insert(subblossoms[id], tree);
deba@338	2877	(*_blossom_data)[subblossoms[id]].next = next;
deba@338	2878	(*_blossom_data)[subblossoms[id]].pred = pred;
deba@338	2879
deba@338	2880	} else {
deba@338	2881
deba@338	2882	for (int i = (ib + 1) % subblossoms.size();
deba@338	2883	i != id; i = (i + 2) % subblossoms.size()) {
deba@338	2884	int sb = subblossoms[i];
deba@338	2885	int tb = subblossoms[(i + 1) % subblossoms.size()];
deba@338	2886	(*_blossom_data)[sb].next =
deba@338	2887	_graph.oppositeArc((*_blossom_data)[tb].next);
deba@338	2888	}
deba@338	2889
deba@338	2890	for (int i = id; i != ib; i = (i + 2) % subblossoms.size()) {
deba@338	2891	int sb = subblossoms[i];
deba@338	2892	int tb = subblossoms[(i + 1) % subblossoms.size()];
deba@338	2893	int ub = subblossoms[(i + 2) % subblossoms.size()];
deba@338	2894
deba@338	2895	(*_blossom_data)[sb].status = ODD;
deba@338	2896	matchedToOdd(sb);
deba@338	2897	_tree_set->insert(sb, tree);
deba@338	2898	(*_blossom_data)[sb].next = next;
deba@338	2899	(*_blossom_data)[sb].pred =
deba@338	2900	_graph.oppositeArc((*_blossom_data)[tb].next);
deba@338	2901
deba@338	2902	(*_blossom_data)[tb].status = EVEN;
deba@338	2903	matchedToEven(tb, tree);
deba@338	2904	_tree_set->insert(tb, tree);
deba@338	2905	(*_blossom_data)[tb].pred =
deba@338	2906	(*_blossom_data)[tb].next =
deba@338	2907	_graph.oppositeArc((*_blossom_data)[ub].next);
deba@338	2908	next = (*_blossom_data)[ub].next;
deba@338	2909	}
deba@338	2910
deba@338	2911	(*_blossom_data)[subblossoms[ib]].status = ODD;
deba@338	2912	matchedToOdd(subblossoms[ib]);
deba@338	2913	_tree_set->insert(subblossoms[ib], tree);
deba@338	2914	(*_blossom_data)[subblossoms[ib]].next = next;
deba@338	2915	(*_blossom_data)[subblossoms[ib]].pred = pred;
deba@338	2916	}
deba@338	2917	_tree_set->erase(blossom);
deba@338	2918	}
deba@338	2919
deba@338	2920	void extractBlossom(int blossom, const Node& base, const Arc& matching) {
deba@338	2921	if (_blossom_set->trivial(blossom)) {
deba@338	2922	int bi = (*_node_index)[base];
deba@338	2923	Value pot = (*_node_data)[bi].pot;
deba@338	2924
kpeter@628	2925	(*_matching)[base] = matching;
deba@338	2926	_blossom_node_list.push_back(base);
kpeter@628	2927	(*_node_potential)[base] = pot;
deba@338	2928	} else {
deba@338	2929
deba@338	2930	Value pot = (*_blossom_data)[blossom].pot;
deba@338	2931	int bn = _blossom_node_list.size();
deba@338	2932
deba@338	2933	std::vector<int> subblossoms;
deba@338	2934	_blossom_set->split(blossom, std::back_inserter(subblossoms));
deba@338	2935	int b = _blossom_set->find(base);
deba@338	2936	int ib = -1;
deba@338	2937	for (int i = 0; i < int(subblossoms.size()); ++i) {
deba@338	2938	if (subblossoms[i] == b) { ib = i; break; }
deba@338	2939	}
deba@338	2940
deba@338	2941	for (int i = 1; i < int(subblossoms.size()); i += 2) {
deba@338	2942	int sb = subblossoms[(ib + i) % subblossoms.size()];
deba@338	2943	int tb = subblossoms[(ib + i + 1) % subblossoms.size()];
deba@338	2944
deba@338	2945	Arc m = (*_blossom_data)[tb].next;
deba@338	2946	extractBlossom(sb, _graph.target(m), _graph.oppositeArc(m));
deba@338	2947	extractBlossom(tb, _graph.source(m), m);
deba@338	2948	}
deba@338	2949	extractBlossom(subblossoms[ib], base, matching);
deba@338	2950
deba@338	2951	int en = _blossom_node_list.size();
deba@338	2952
deba@338	2953	_blossom_potential.push_back(BlossomVariable(bn, en, pot));
deba@338	2954	}
deba@338	2955	}
deba@338	2956
deba@338	2957	void extractMatching() {
deba@338	2958	std::vector<int> blossoms;
deba@338	2959	for (typename BlossomSet::ClassIt c(*_blossom_set); c != INVALID; ++c) {
deba@338	2960	blossoms.push_back(c);
deba@338	2961	}
deba@338	2962
deba@338	2963	for (int i = 0; i < int(blossoms.size()); ++i) {
deba@338	2964
deba@338	2965	Value offset = (*_blossom_data)[blossoms[i]].offset;
deba@338	2966	(_blossom_data)[blossoms[i]].pot += 2 offset;
deba@338	2967	for (typename BlossomSet::ItemIt n(*_blossom_set, blossoms[i]);
deba@338	2968	n != INVALID; ++n) {
deba@338	2969	(_node_data)[(_node_index)[n]].pot -= offset;
deba@338	2970	}
deba@338	2971
deba@338	2972	Arc matching = (*_blossom_data)[blossoms[i]].next;
deba@338	2973	Node base = _graph.source(matching);
deba@338	2974	extractBlossom(blossoms[i], base, matching);
deba@338	2975	}
deba@338	2976	}
deba@338	2977
deba@338	2978	public:
deba@338	2979
deba@338	2980	/// \brief Constructor
deba@338	2981	///
deba@338	2982	/// Constructor.
deba@338	2983	MaxWeightedPerfectMatching(const Graph& graph, const WeightMap& weight)
deba@338	2984	: _graph(graph), _weight(weight), _matching(0),
deba@338	2985	_node_potential(0), _blossom_potential(), _blossom_node_list(),
deba@338	2986	_node_num(0), _blossom_num(0),
deba@338	2987
deba@338	2988	_blossom_index(0), _blossom_set(0), _blossom_data(0),
deba@338	2989	_node_index(0), _node_heap_index(0), _node_data(0),
deba@338	2990	_tree_set_index(0), _tree_set(0),
deba@338	2991
deba@338	2992	_delta2_index(0), _delta2(0),
deba@338	2993	_delta3_index(0), _delta3(0),
deba@338	2994	_delta4_index(0), _delta4(0),
deba@338	2995
deba@949	2996	_delta_sum(), _unmatched(0),
deba@949	2997
deba@949	2998	_fractional(0)
deba@949	2999	{}
deba@338	3000
deba@338	3001	~MaxWeightedPerfectMatching() {
deba@338	3002	destroyStructures();
deba@949	3003	if (_fractional) {
deba@949	3004	delete _fractional;
deba@949	3005	}
deba@338	3006	}
deba@338	3007
kpeter@637	3008	/// \name Execution Control
alpar@342	3009	/// The simplest way to execute the algorithm is to use the
kpeter@637	3010	/// \ref run() member function.
deba@338	3011
deba@338	3012	///@{
deba@338	3013
deba@338	3014	/// \brief Initialize the algorithm
deba@338	3015	///
kpeter@637	3016	/// This function initializes the algorithm.
deba@338	3017	void init() {
deba@338	3018	createStructures();
deba@338	3019
deba@945	3020	_blossom_node_list.clear();
deba@945	3021	_blossom_potential.clear();
deba@945	3022
deba@338	3023	for (ArcIt e(_graph); e != INVALID; ++e) {
kpeter@628	3024	(*_node_heap_index)[e] = BinHeap<Value, IntArcMap>::PRE_HEAP;
deba@338	3025	}
deba@338	3026	for (EdgeIt e(_graph); e != INVALID; ++e) {
kpeter@628	3027	(*_delta3_index)[e] = _delta3->PRE_HEAP;
deba@338	3028	}
deba@338	3029	for (int i = 0; i < _blossom_num; ++i) {
kpeter@628	3030	(*_delta2_index)[i] = _delta2->PRE_HEAP;
kpeter@628	3031	(*_delta4_index)[i] = _delta4->PRE_HEAP;
deba@338	3032	}
deba@338	3033
deba@949	3034	_unmatched = _node_num;
deba@949	3035
deba@945	3036	_delta2->clear();
deba@945	3037	_delta3->clear();
deba@945	3038	_delta4->clear();
deba@945	3039	_blossom_set->clear();
deba@945	3040	_tree_set->clear();
deba@945	3041
deba@338	3042	int index = 0;
deba@338	3043	for (NodeIt n(_graph); n != INVALID; ++n) {
deba@338	3044	Value max = - std::numeric_limits<Value>::max();
deba@338	3045	for (OutArcIt e(_graph, n); e != INVALID; ++e) {
deba@338	3046	if (_graph.target(e) == n) continue;
deba@338	3047	if ((dualScale * _weight[e]) / 2 > max) {
deba@338	3048	max = (dualScale * _weight[e]) / 2;
deba@338	3049	}
deba@338	3050	}
kpeter@628	3051	(*_node_index)[n] = index;
deba@945	3052	(*_node_data)[index].heap_index.clear();
deba@945	3053	(*_node_data)[index].heap.clear();
deba@338	3054	(*_node_data)[index].pot = max;
deba@338	3055	int blossom =
deba@338	3056	_blossom_set->insert(n, std::numeric_limits<Value>::max());
deba@338	3057
deba@338	3058	_tree_set->insert(blossom);
deba@338	3059
deba@338	3060	(*_blossom_data)[blossom].status = EVEN;
deba@338	3061	(*_blossom_data)[blossom].pred = INVALID;
deba@338	3062	(*_blossom_data)[blossom].next = INVALID;
deba@338	3063	(*_blossom_data)[blossom].pot = 0;
deba@338	3064	(*_blossom_data)[blossom].offset = 0;
deba@338	3065	++index;
deba@338	3066	}
deba@338	3067	for (EdgeIt e(_graph); e != INVALID; ++e) {
deba@338	3068	int si = (*_node_index)[_graph.u(e)];
deba@338	3069	int ti = (*_node_index)[_graph.v(e)];
deba@338	3070	if (_graph.u(e) != _graph.v(e)) {
deba@338	3071	_delta3->push(e, ((_node_data)[si].pot + (_node_data)[ti].pot -
deba@338	3072	dualScale * _weight[e]) / 2);
deba@338	3073	}
deba@338	3074	}
deba@338	3075	}
deba@338	3076
deba@949	3077	/// \brief Initialize the algorithm with fractional matching
deba@949	3078	///
deba@949	3079	/// This function initializes the algorithm with a fractional
deba@949	3080	/// matching. This initialization is also called jumpstart heuristic.
deba@949	3081	void fractionalInit() {
deba@949	3082	createStructures();
deba@949	3083
deba@949	3084	if (_fractional == 0) {
deba@949	3085	_fractional = new FractionalMatching(_graph, _weight, false);
deba@949	3086	}
deba@949	3087	if (!_fractional->run()) {
deba@949	3088	_unmatched = -1;
deba@949	3089	return;
deba@949	3090	}
deba@949	3091
deba@949	3092	for (ArcIt e(_graph); e != INVALID; ++e) {
deba@949	3093	(*_node_heap_index)[e] = BinHeap<Value, IntArcMap>::PRE_HEAP;
deba@949	3094	}
deba@949	3095	for (EdgeIt e(_graph); e != INVALID; ++e) {
deba@949	3096	(*_delta3_index)[e] = _delta3->PRE_HEAP;
deba@949	3097	}
deba@949	3098	for (int i = 0; i < _blossom_num; ++i) {
deba@949	3099	(*_delta2_index)[i] = _delta2->PRE_HEAP;
deba@949	3100	(*_delta4_index)[i] = _delta4->PRE_HEAP;
deba@949	3101	}
deba@949	3102
deba@949	3103	_unmatched = 0;
deba@949	3104
deba@949	3105	int index = 0;
deba@949	3106	for (NodeIt n(_graph); n != INVALID; ++n) {
deba@949	3107	Value pot = _fractional->nodeValue(n);
deba@949	3108	(*_node_index)[n] = index;
deba@949	3109	(*_node_data)[index].pot = pot;
deba@949	3110	int blossom =
deba@949	3111	_blossom_set->insert(n, std::numeric_limits<Value>::max());
deba@949	3112
deba@949	3113	(*_blossom_data)[blossom].status = MATCHED;
deba@949	3114	(*_blossom_data)[blossom].pred = INVALID;
deba@949	3115	(*_blossom_data)[blossom].next = _fractional->matching(n);
deba@949	3116	(*_blossom_data)[blossom].pot = 0;
deba@949	3117	(*_blossom_data)[blossom].offset = 0;
deba@949	3118	++index;
deba@949	3119	}
deba@949	3120
deba@949	3121	typename Graph::template NodeMap<bool> processed(_graph, false);
deba@949	3122	for (NodeIt n(_graph); n != INVALID; ++n) {
deba@949	3123	if (processed[n]) continue;
deba@949	3124	processed[n] = true;
deba@949	3125	if (_fractional->matching(n) == INVALID) continue;
deba@949	3126	int num = 1;
deba@949	3127	Node v = _graph.target(_fractional->matching(n));
deba@949	3128	while (n != v) {
deba@949	3129	processed[v] = true;
deba@949	3130	v = _graph.target(_fractional->matching(v));
deba@949	3131	++num;
deba@949	3132	}
deba@949	3133
deba@949	3134	if (num % 2 == 1) {
deba@949	3135	std::vector<int> subblossoms(num);
deba@949	3136
deba@949	3137	subblossoms[--num] = _blossom_set->find(n);
deba@949	3138	v = _graph.target(_fractional->matching(n));
deba@949	3139	while (n != v) {
deba@949	3140	subblossoms[--num] = _blossom_set->find(v);
deba@949	3141	v = _graph.target(_fractional->matching(v));
deba@949	3142	}
deba@949	3143
deba@949	3144	int surface =
deba@949	3145	_blossom_set->join(subblossoms.begin(), subblossoms.end());
deba@949	3146	(*_blossom_data)[surface].status = EVEN;
deba@949	3147	(*_blossom_data)[surface].pred = INVALID;
deba@949	3148	(*_blossom_data)[surface].next = INVALID;
deba@949	3149	(*_blossom_data)[surface].pot = 0;
deba@949	3150	(*_blossom_data)[surface].offset = 0;
deba@949	3151
deba@949	3152	_tree_set->insert(surface);
deba@949	3153	++_unmatched;
deba@949	3154	}
deba@949	3155	}
deba@949	3156
deba@949	3157	for (EdgeIt e(_graph); e != INVALID; ++e) {
deba@949	3158	int si = (*_node_index)[_graph.u(e)];
deba@949	3159	int sb = _blossom_set->find(_graph.u(e));
deba@949	3160	int ti = (*_node_index)[_graph.v(e)];
deba@949	3161	int tb = _blossom_set->find(_graph.v(e));
deba@949	3162	if ((*_blossom_data)[sb].status == EVEN &&
deba@949	3163	(*_blossom_data)[tb].status == EVEN && sb != tb) {
deba@949	3164	_delta3->push(e, ((_node_data)[si].pot + (_node_data)[ti].pot -
deba@949	3165	dualScale * _weight[e]) / 2);
deba@949	3166	}
deba@949	3167	}
deba@949	3168
deba@949	3169	for (NodeIt n(_graph); n != INVALID; ++n) {
deba@949	3170	int nb = _blossom_set->find(n);
deba@949	3171	if ((*_blossom_data)[nb].status != MATCHED) continue;
deba@949	3172	int ni = (*_node_index)[n];
deba@949	3173
deba@949	3174	for (OutArcIt e(_graph, n); e != INVALID; ++e) {
deba@949	3175	Node v = _graph.target(e);
deba@949	3176	int vb = _blossom_set->find(v);
deba@949	3177	int vi = (*_node_index)[v];
deba@949	3178
deba@949	3179	Value rw = (_node_data)[ni].pot + (_node_data)[vi].pot -
deba@949	3180	dualScale * _weight[e];
deba@949	3181
deba@949	3182	if ((*_blossom_data)[vb].status == EVEN) {
deba@949	3183
deba@949	3184	int vt = _tree_set->find(vb);
deba@949	3185
deba@949	3186	typename std::map<int, Arc>::iterator it =
deba@949	3187	(*_node_data)[ni].heap_index.find(vt);
deba@949	3188
deba@949	3189	if (it != (*_node_data)[ni].heap_index.end()) {
deba@949	3190	if ((*_node_data)[ni].heap[it->second] > rw) {
deba@949	3191	(*_node_data)[ni].heap.replace(it->second, e);
deba@949	3192	(*_node_data)[ni].heap.decrease(e, rw);
deba@949	3193	it->second = e;
deba@949	3194	}
deba@949	3195	} else {
deba@949	3196	(*_node_data)[ni].heap.push(e, rw);
deba@949	3197	(*_node_data)[ni].heap_index.insert(std::make_pair(vt, e));
deba@949	3198	}
deba@949	3199	}
deba@949	3200	}
deba@949	3201
deba@949	3202	if (!(*_node_data)[ni].heap.empty()) {
deba@949	3203	_blossom_set->decrease(n, (*_node_data)[ni].heap.prio());
deba@949	3204	_delta2->push(nb, _blossom_set->classPrio(nb));
deba@949	3205	}
deba@949	3206	}
deba@949	3207	}
deba@949	3208
kpeter@637	3209	/// \brief Start the algorithm
deba@338	3210	///
kpeter@637	3211	/// This function starts the algorithm.
kpeter@637	3212	///
deba@949	3213	/// \pre \ref init() or \ref fractionalInit() must be called before
deba@949	3214	/// using this function.
deba@338	3215	bool start() {
deba@338	3216	enum OpType {
deba@338	3217	D2, D3, D4
deba@338	3218	};
deba@338	3219
deba@949	3220	if (_unmatched == -1) return false;
deba@949	3221
deba@949	3222	while (_unmatched > 0) {
deba@338	3223	Value d2 = !_delta2->empty() ?
deba@338	3224	_delta2->prio() : std::numeric_limits<Value>::max();
deba@338	3225
deba@338	3226	Value d3 = !_delta3->empty() ?
deba@338	3227	_delta3->prio() : std::numeric_limits<Value>::max();
deba@338	3228
deba@338	3229	Value d4 = !_delta4->empty() ?
deba@338	3230	_delta4->prio() : std::numeric_limits<Value>::max();
deba@338	3231
deba@947	3232	_delta_sum = d3; OpType ot = D3;
deba@947	3233	if (d2 < _delta_sum) { _delta_sum = d2; ot = D2; }
deba@338	3234	if (d4 < _delta_sum) { _delta_sum = d4; ot = D4; }
deba@338	3235
deba@338	3236	if (_delta_sum == std::numeric_limits<Value>::max()) {
deba@338	3237	return false;
deba@338	3238	}
deba@338	3239
deba@338	3240	switch (ot) {
deba@338	3241	case D2:
deba@338	3242	{
deba@338	3243	int blossom = _delta2->top();
deba@338	3244	Node n = _blossom_set->classTop(blossom);
deba@338	3245	Arc e = (_node_data)[(_node_index)[n]].heap.top();
deba@338	3246	extendOnArc(e);
deba@338	3247	}
deba@338	3248	break;
deba@338	3249	case D3:
deba@338	3250	{
deba@338	3251	Edge e = _delta3->top();
deba@338	3252
deba@338	3253	int left_blossom = _blossom_set->find(_graph.u(e));
deba@338	3254	int right_blossom = _blossom_set->find(_graph.v(e));
deba@338	3255
deba@338	3256	if (left_blossom == right_blossom) {
deba@338	3257	_delta3->pop();
deba@338	3258	} else {
deba@338	3259	int left_tree = _tree_set->find(left_blossom);
deba@338	3260	int right_tree = _tree_set->find(right_blossom);
deba@338	3261
deba@338	3262	if (left_tree == right_tree) {
deba@339	3263	shrinkOnEdge(e, left_tree);
deba@338	3264	} else {
deba@339	3265	augmentOnEdge(e);
deba@949	3266	_unmatched -= 2;
deba@338	3267	}
deba@338	3268	}
deba@338	3269	} break;
deba@338	3270	case D4:
deba@338	3271	splitBlossom(_delta4->top());
deba@338	3272	break;
deba@338	3273	}
deba@338	3274	}
deba@338	3275	extractMatching();
deba@338	3276	return true;
deba@338	3277	}
deba@338	3278
kpeter@637	3279	/// \brief Run the algorithm.
deba@338	3280	///
kpeter@637	3281	/// This method runs the \c %MaxWeightedPerfectMatching algorithm.
deba@338	3282	///
kpeter@637	3283	/// \note mwpm.run() is just a shortcut of the following code.
deba@338	3284	/// \code
deba@949	3285	/// mwpm.fractionalInit();
kpeter@637	3286	/// mwpm.start();
deba@338	3287	/// \endcode
deba@338	3288	bool run() {
deba@949	3289	fractionalInit();
deba@338	3290	return start();
deba@338	3291	}
deba@338	3292
deba@338	3293	/// @}
deba@338	3294
kpeter@637	3295	/// \name Primal Solution
deba@947	3296	/// Functions to get the primal solution, i.e. the maximum weighted
kpeter@637	3297	/// perfect matching.\n
kpeter@637	3298	/// Either \ref run() or \ref start() function should be called before
kpeter@637	3299	/// using them.
deba@338	3300
deba@338	3301	/// @{
deba@338	3302
kpeter@637	3303	/// \brief Return the weight of the matching.
deba@338	3304	///
kpeter@637	3305	/// This function returns the weight of the found matching.
kpeter@637	3306	///
kpeter@637	3307	/// \pre Either run() or start() must be called before using this function.
kpeter@640	3308	Value matchingWeight() const {
deba@338	3309	Value sum = 0;
deba@338	3310	for (NodeIt n(_graph); n != INVALID; ++n) {
deba@338	3311	if ((*_matching)[n] != INVALID) {
deba@338	3312	sum += _weight[(*_matching)[n]];
deba@338	3313	}
deba@338	3314	}
deba@947	3315	return sum / 2;
deba@338	3316	}
deba@338	3317
kpeter@637	3318	/// \brief Return \c true if the given edge is in the matching.
deba@338	3319	///
deba@947	3320	/// This function returns \c true if the given edge is in the found
kpeter@637	3321	/// matching.
kpeter@637	3322	///
kpeter@637	3323	/// \pre Either run() or start() must be called before using this function.
deba@339	3324	bool matching(const Edge& edge) const {
deba@339	3325	return static_cast<const Edge&>((*_matching)[_graph.u(edge)]) == edge;
deba@338	3326	}
deba@338	3327
kpeter@637	3328	/// \brief Return the matching arc (or edge) incident to the given node.
deba@338	3329	///
kpeter@637	3330	/// This function returns the matching arc (or edge) incident to the
deba@947	3331	/// given node in the found matching or \c INVALID if the node is
kpeter@637	3332	/// not covered by the matching.
kpeter@637	3333	///
kpeter@637	3334	/// \pre Either run() or start() must be called before using this function.
deba@338	3335	Arc matching(const Node& node) const {
deba@338	3336	return (*_matching)[node];
deba@338	3337	}
deba@338	3338
kpeter@640	3339	/// \brief Return a const reference to the matching map.
kpeter@640	3340	///
kpeter@640	3341	/// This function returns a const reference to a node map that stores
kpeter@640	3342	/// the matching arc (or edge) incident to each node.
kpeter@640	3343	const MatchingMap& matchingMap() const {
kpeter@640	3344	return *_matching;
kpeter@640	3345	}
kpeter@640	3346
kpeter@637	3347	/// \brief Return the mate of the given node.
deba@338	3348	///
deba@947	3349	/// This function returns the mate of the given node in the found
kpeter@637	3350	/// matching or \c INVALID if the node is not covered by the matching.
kpeter@637	3351	///
kpeter@637	3352	/// \pre Either run() or start() must be called before using this function.
deba@338	3353	Node mate(const Node& node) const {
deba@338	3354	return _graph.target((*_matching)[node]);
deba@338	3355	}
deba@338	3356
deba@338	3357	/// @}
deba@338	3358
kpeter@637	3359	/// \name Dual Solution
kpeter@637	3360	/// Functions to get the dual solution.\n
kpeter@637	3361	/// Either \ref run() or \ref start() function should be called before
kpeter@637	3362	/// using them.
deba@338	3363
deba@338	3364	/// @{
deba@338	3365
kpeter@637	3366	/// \brief Return the value of the dual solution.
deba@338	3367	///
deba@947	3368	/// This function returns the value of the dual solution.
deba@947	3369	/// It should be equal to the primal value scaled by \ref dualScale
kpeter@637	3370	/// "dual scale".
kpeter@637	3371	///
kpeter@637	3372	/// \pre Either run() or start() must be called before using this function.
deba@338	3373	Value dualValue() const {
deba@338	3374	Value sum = 0;
deba@338	3375	for (NodeIt n(_graph); n != INVALID; ++n) {
deba@338	3376	sum += nodeValue(n);
deba@338	3377	}
deba@338	3378	for (int i = 0; i < blossomNum(); ++i) {
deba@338	3379	sum += blossomValue(i) * (blossomSize(i) / 2);
deba@338	3380	}
deba@338	3381	return sum;
deba@338	3382	}
deba@338	3383
kpeter@637	3384	/// \brief Return the dual value (potential) of the given node.
deba@338	3385	///
kpeter@637	3386	/// This function returns the dual value (potential) of the given node.
kpeter@637	3387	///
kpeter@637	3388	/// \pre Either run() or start() must be called before using this function.
deba@338	3389	Value nodeValue(const Node& n) const {
deba@338	3390	return (*_node_potential)[n];
deba@338	3391	}
deba@338	3392
kpeter@637	3393	/// \brief Return the number of the blossoms in the basis.
deba@338	3394	///
kpeter@637	3395	/// This function returns the number of the blossoms in the basis.
kpeter@637	3396	///
kpeter@637	3397	/// \pre Either run() or start() must be called before using this function.
deba@338	3398	/// \see BlossomIt
deba@338	3399	int blossomNum() const {
deba@338	3400	return _blossom_potential.size();
deba@338	3401	}
deba@338	3402
kpeter@637	3403	/// \brief Return the number of the nodes in the given blossom.
deba@338	3404	///
kpeter@637	3405	/// This function returns the number of the nodes in the given blossom.
kpeter@637	3406	///
kpeter@637	3407	/// \pre Either run() or start() must be called before using this function.
kpeter@637	3408	/// \see BlossomIt
deba@338	3409	int blossomSize(int k) const {
deba@338	3410	return _blossom_potential[k].end - _blossom_potential[k].begin;
deba@338	3411	}
deba@338	3412
kpeter@637	3413	/// \brief Return the dual value (ptential) of the given blossom.
deba@338	3414	///
kpeter@637	3415	/// This function returns the dual value (ptential) of the given blossom.
kpeter@637	3416	///
kpeter@637	3417	/// \pre Either run() or start() must be called before using this function.
deba@338	3418	Value blossomValue(int k) const {
deba@338	3419	return _blossom_potential[k].value;
deba@338	3420	}
deba@338	3421
kpeter@637	3422	/// \brief Iterator for obtaining the nodes of a blossom.
deba@338	3423	///
deba@947	3424	/// This class provides an iterator for obtaining the nodes of the
kpeter@637	3425	/// given blossom. It lists a subset of the nodes.
deba@947	3426	/// Before using this iterator, you must allocate a
kpeter@637	3427	/// MaxWeightedPerfectMatching class and execute it.
deba@338	3428	class BlossomIt {
deba@338	3429	public:
deba@338	3430
deba@338	3431	/// \brief Constructor.
deba@338	3432	///
kpeter@637	3433	/// Constructor to get the nodes of the given variable.
kpeter@637	3434	///
deba@947	3435	/// \pre Either \ref MaxWeightedPerfectMatching::run() "algorithm.run()"
deba@947	3436	/// or \ref MaxWeightedPerfectMatching::start() "algorithm.start()"
kpeter@637	3437	/// must be called before initializing this iterator.
deba@338	3438	BlossomIt(const MaxWeightedPerfectMatching& algorithm, int variable)
deba@338	3439	: _algorithm(&algorithm)
deba@338	3440	{
deba@338	3441	_index = _algorithm->_blossom_potential[variable].begin;
deba@338	3442	_last = _algorithm->_blossom_potential[variable].end;
deba@338	3443	}
deba@338	3444
kpeter@637	3445	/// \brief Conversion to \c Node.
deba@338	3446	///
kpeter@637	3447	/// Conversion to \c Node.
deba@338	3448	operator Node() const {
deba@339	3449	return _algorithm->_blossom_node_list[_index];
deba@338	3450	}
deba@338	3451
deba@338	3452	/// \brief Increment operator.
deba@338	3453	///
deba@338	3454	/// Increment operator.
deba@338	3455	BlossomIt& operator++() {
deba@338	3456	++_index;
deba@338	3457	return *this;
deba@338	3458	}
deba@338	3459
deba@339	3460	/// \brief Validity checking
deba@339	3461	///
kpeter@637	3462	/// This function checks whether the iterator is invalid.
deba@339	3463	bool operator==(Invalid) const { return _index == _last; }
deba@339	3464
deba@339	3465	/// \brief Validity checking
deba@339	3466	///
kpeter@637	3467	/// This function checks whether the iterator is valid.
deba@339	3468	bool operator!=(Invalid) const { return _index != _last; }
deba@338	3469
deba@338	3470	private:
deba@338	3471	const MaxWeightedPerfectMatching* _algorithm;
deba@338	3472	int _last;
deba@338	3473	int _index;
deba@338	3474	};
deba@338	3475
deba@338	3476	/// @}
deba@338	3477
deba@338	3478	};
deba@338	3479
deba@338	3480	} //END OF NAMESPACE LEMON
deba@338	3481
deba@947	3482	#endif //LEMON_MATCHING_H

author	Alpar Juttner <alpar@cs.elte.hu>
	Wed, 17 Mar 2010 10:29:57 +0100
changeset 954	07ec2b52e53d
parent 949	61120524af27
parent 945	5b926cc36a4b
child 955	7f6e2bd76654
permissions	-rw-r--r--