Location: LEMON/LEMON-official/lemon/edge_set.h - annotation
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Suppress or fix VS2008 warnings + turn off faulty tests using CMAKE (#208)
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r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a r491:68fe66e2b34a | /* -*- mode: C++; indent-tabs-mode: nil; -*-
*
* This file is a part of LEMON, a generic C++ optimization library.
*
* Copyright (C) 2003-2008
* Egervary Jeno Kombinatorikus Optimalizalasi Kutatocsoport
* (Egervary Research Group on Combinatorial Optimization, EGRES).
*
* Permission to use, modify and distribute this software is granted
* provided that this copyright notice appears in all copies. For
* precise terms see the accompanying LICENSE file.
*
* This software is provided "AS IS" with no warranty of any kind,
* express or implied, and with no claim as to its suitability for any
* purpose.
*
*/
#ifndef LEMON_EDGE_SET_H
#define LEMON_EDGE_SET_H
#include <lemon/core.h>
#include <lemon/bits/edge_set_extender.h>
/// \ingroup semi_adaptors
/// \file
/// \brief ArcSet and EdgeSet classes.
///
/// Graphs which use another graph's node-set as own.
namespace lemon {
template <typename _Graph>
class ListArcSetBase {
public:
typedef _Graph Graph;
typedef typename Graph::Node Node;
typedef typename Graph::NodeIt NodeIt;
protected:
struct NodeT {
int first_out, first_in;
NodeT() : first_out(-1), first_in(-1) {}
};
typedef typename ItemSetTraits<Graph, Node>::
template Map<NodeT>::Type NodesImplBase;
NodesImplBase* nodes;
struct ArcT {
Node source, target;
int next_out, next_in;
int prev_out, prev_in;
ArcT() : prev_out(-1), prev_in(-1) {}
};
std::vector<ArcT> arcs;
int first_arc;
int first_free_arc;
const Graph* graph;
void initalize(const Graph& _graph, NodesImplBase& _nodes) {
graph = &_graph;
nodes = &_nodes;
}
public:
class Arc {
friend class ListArcSetBase<Graph>;
protected:
Arc(int _id) : id(_id) {}
int id;
public:
Arc() {}
Arc(Invalid) : id(-1) {}
bool operator==(const Arc& arc) const { return id == arc.id; }
bool operator!=(const Arc& arc) const { return id != arc.id; }
bool operator<(const Arc& arc) const { return id < arc.id; }
};
ListArcSetBase() : first_arc(-1), first_free_arc(-1) {}
Arc addArc(const Node& u, const Node& v) {
int n;
if (first_free_arc == -1) {
n = arcs.size();
arcs.push_back(ArcT());
} else {
n = first_free_arc;
first_free_arc = arcs[first_free_arc].next_in;
}
arcs[n].next_in = (*nodes)[v].first_in;
if ((*nodes)[v].first_in != -1) {
arcs[(*nodes)[v].first_in].prev_in = n;
}
(*nodes)[v].first_in = n;
arcs[n].next_out = (*nodes)[u].first_out;
if ((*nodes)[u].first_out != -1) {
arcs[(*nodes)[u].first_out].prev_out = n;
}
(*nodes)[u].first_out = n;
arcs[n].source = u;
arcs[n].target = v;
return Arc(n);
}
void erase(const Arc& arc) {
int n = arc.id;
if (arcs[n].prev_in != -1) {
arcs[arcs[n].prev_in].next_in = arcs[n].next_in;
} else {
(*nodes)[arcs[n].target].first_in = arcs[n].next_in;
}
if (arcs[n].next_in != -1) {
arcs[arcs[n].next_in].prev_in = arcs[n].prev_in;
}
if (arcs[n].prev_out != -1) {
arcs[arcs[n].prev_out].next_out = arcs[n].next_out;
} else {
(*nodes)[arcs[n].source].first_out = arcs[n].next_out;
}
if (arcs[n].next_out != -1) {
arcs[arcs[n].next_out].prev_out = arcs[n].prev_out;
}
}
void clear() {
Node node;
for (first(node); node != INVALID; next(node)) {
(*nodes)[node].first_in = -1;
(*nodes)[node].first_out = -1;
}
arcs.clear();
first_arc = -1;
first_free_arc = -1;
}
void first(Node& node) const {
graph->first(node);
}
void next(Node& node) const {
graph->next(node);
}
void first(Arc& arc) const {
Node node;
first(node);
while (node != INVALID && (*nodes)[node].first_in == -1) {
next(node);
}
arc.id = (node == INVALID) ? -1 : (*nodes)[node].first_in;
}
void next(Arc& arc) const {
if (arcs[arc.id].next_in != -1) {
arc.id = arcs[arc.id].next_in;
} else {
Node node = arcs[arc.id].target;
next(node);
while (node != INVALID && (*nodes)[node].first_in == -1) {
next(node);
}
arc.id = (node == INVALID) ? -1 : (*nodes)[node].first_in;
}
}
void firstOut(Arc& arc, const Node& node) const {
arc.id = (*nodes)[node].first_out;
}
void nextOut(Arc& arc) const {
arc.id = arcs[arc.id].next_out;
}
void firstIn(Arc& arc, const Node& node) const {
arc.id = (*nodes)[node].first_in;
}
void nextIn(Arc& arc) const {
arc.id = arcs[arc.id].next_in;
}
int id(const Node& node) const { return graph->id(node); }
int id(const Arc& arc) const { return arc.id; }
Node nodeFromId(int ix) const { return graph->nodeFromId(ix); }
Arc arcFromId(int ix) const { return Arc(ix); }
int maxNodeId() const { return graph->maxNodeId(); };
int maxArcId() const { return arcs.size() - 1; }
Node source(const Arc& arc) const { return arcs[arc.id].source;}
Node target(const Arc& arc) const { return arcs[arc.id].target;}
typedef typename ItemSetTraits<Graph, Node>::ItemNotifier NodeNotifier;
NodeNotifier& notifier(Node) const {
return graph->notifier(Node());
}
template <typename _Value>
class NodeMap : public Graph::template NodeMap<_Value> {
public:
typedef typename _Graph::template NodeMap<_Value> Parent;
explicit NodeMap(const ListArcSetBase<Graph>& arcset)
: Parent(*arcset.graph) {}
NodeMap(const ListArcSetBase<Graph>& arcset, const _Value& value)
: Parent(*arcset.graph, value) {}
NodeMap& operator=(const NodeMap& cmap) {
return operator=<NodeMap>(cmap);
}
template <typename CMap>
NodeMap& operator=(const CMap& cmap) {
Parent::operator=(cmap);
return *this;
}
};
};
/// \ingroup semi_adaptors
///
/// \brief Digraph using a node set of another digraph or graph and
/// an own arc set.
///
/// This structure can be used to establish another directed graph
/// over a node set of an existing one. This class uses the same
/// Node type as the underlying graph, and each valid node of the
/// original graph is valid in this arc set, therefore the node
/// objects of the original graph can be used directly with this
/// class. The node handling functions (id handling, observing, and
/// iterators) works equivalently as in the original graph.
///
/// This implementation is based on doubly-linked lists, from each
/// node the outgoing and the incoming arcs make up lists, therefore
/// one arc can be erased in constant time. It also makes possible,
/// that node can be removed from the underlying graph, in this case
/// all arcs incident to the given node is erased from the arc set.
///
/// \param _Graph The type of the graph which shares its node set with
/// this class. Its interface must conform to the
/// \ref concepts::Digraph "Digraph" or \ref concepts::Graph "Graph"
/// concept.
///
/// This class is fully conform to the \ref concepts::Digraph
/// "Digraph" concept.
template <typename _Graph>
class ListArcSet : public ArcSetExtender<ListArcSetBase<_Graph> > {
public:
typedef ArcSetExtender<ListArcSetBase<_Graph> > Parent;
typedef typename Parent::Node Node;
typedef typename Parent::Arc Arc;
typedef _Graph Graph;
typedef typename Parent::NodesImplBase NodesImplBase;
void eraseNode(const Node& node) {
Arc arc;
Parent::firstOut(arc, node);
while (arc != INVALID ) {
erase(arc);
Parent::firstOut(arc, node);
}
Parent::firstIn(arc, node);
while (arc != INVALID ) {
erase(arc);
Parent::firstIn(arc, node);
}
}
void clearNodes() {
Parent::clear();
}
class NodesImpl : public NodesImplBase {
public:
typedef NodesImplBase Parent;
NodesImpl(const Graph& graph, ListArcSet& arcset)
: Parent(graph), _arcset(arcset) {}
virtual ~NodesImpl() {}
protected:
virtual void erase(const Node& node) {
_arcset.eraseNode(node);
Parent::erase(node);
}
virtual void erase(const std::vector<Node>& nodes) {
for (int i = 0; i < int(nodes.size()); ++i) {
_arcset.eraseNode(nodes[i]);
}
Parent::erase(nodes);
}
virtual void clear() {
_arcset.clearNodes();
Parent::clear();
}
private:
ListArcSet& _arcset;
};
NodesImpl nodes;
public:
/// \brief Constructor of the ArcSet.
///
/// Constructor of the ArcSet.
ListArcSet(const Graph& graph) : nodes(graph, *this) {
Parent::initalize(graph, nodes);
}
/// \brief Add a new arc to the digraph.
///
/// Add a new arc to the digraph with source node \c s
/// and target node \c t.
/// \return the new arc.
Arc addArc(const Node& s, const Node& t) {
return Parent::addArc(s, t);
}
/// \brief Erase an arc from the digraph.
///
/// Erase an arc \c a from the digraph.
void erase(const Arc& a) {
return Parent::erase(a);
}
};
template <typename _Graph>
class ListEdgeSetBase {
public:
typedef _Graph Graph;
typedef typename Graph::Node Node;
typedef typename Graph::NodeIt NodeIt;
protected:
struct NodeT {
int first_out;
NodeT() : first_out(-1) {}
};
typedef typename ItemSetTraits<Graph, Node>::
template Map<NodeT>::Type NodesImplBase;
NodesImplBase* nodes;
struct ArcT {
Node target;
int prev_out, next_out;
ArcT() : prev_out(-1), next_out(-1) {}
};
std::vector<ArcT> arcs;
int first_arc;
int first_free_arc;
const Graph* graph;
void initalize(const Graph& _graph, NodesImplBase& _nodes) {
graph = &_graph;
nodes = &_nodes;
}
public:
class Edge {
friend class ListEdgeSetBase;
protected:
int id;
explicit Edge(int _id) { id = _id;}
public:
Edge() {}
Edge (Invalid) { id = -1; }
bool operator==(const Edge& arc) const {return id == arc.id;}
bool operator!=(const Edge& arc) const {return id != arc.id;}
bool operator<(const Edge& arc) const {return id < arc.id;}
};
class Arc {
friend class ListEdgeSetBase;
protected:
Arc(int _id) : id(_id) {}
int id;
public:
operator Edge() const { return edgeFromId(id / 2); }
Arc() {}
Arc(Invalid) : id(-1) {}
bool operator==(const Arc& arc) const { return id == arc.id; }
bool operator!=(const Arc& arc) const { return id != arc.id; }
bool operator<(const Arc& arc) const { return id < arc.id; }
};
ListEdgeSetBase() : first_arc(-1), first_free_arc(-1) {}
Edge addEdge(const Node& u, const Node& v) {
int n;
if (first_free_arc == -1) {
n = arcs.size();
arcs.push_back(ArcT());
arcs.push_back(ArcT());
} else {
n = first_free_arc;
first_free_arc = arcs[n].next_out;
}
arcs[n].target = u;
arcs[n | 1].target = v;
arcs[n].next_out = (*nodes)[v].first_out;
if ((*nodes)[v].first_out != -1) {
arcs[(*nodes)[v].first_out].prev_out = n;
}
(*nodes)[v].first_out = n;
arcs[n].prev_out = -1;
if ((*nodes)[u].first_out != -1) {
arcs[(*nodes)[u].first_out].prev_out = (n | 1);
}
arcs[n | 1].next_out = (*nodes)[u].first_out;
(*nodes)[u].first_out = (n | 1);
arcs[n | 1].prev_out = -1;
return Edge(n / 2);
}
void erase(const Edge& arc) {
int n = arc.id * 2;
if (arcs[n].next_out != -1) {
arcs[arcs[n].next_out].prev_out = arcs[n].prev_out;
}
if (arcs[n].prev_out != -1) {
arcs[arcs[n].prev_out].next_out = arcs[n].next_out;
} else {
(*nodes)[arcs[n | 1].target].first_out = arcs[n].next_out;
}
if (arcs[n | 1].next_out != -1) {
arcs[arcs[n | 1].next_out].prev_out = arcs[n | 1].prev_out;
}
if (arcs[n | 1].prev_out != -1) {
arcs[arcs[n | 1].prev_out].next_out = arcs[n | 1].next_out;
} else {
(*nodes)[arcs[n].target].first_out = arcs[n | 1].next_out;
}
arcs[n].next_out = first_free_arc;
first_free_arc = n;
}
void clear() {
Node node;
for (first(node); node != INVALID; next(node)) {
(*nodes)[node].first_out = -1;
}
arcs.clear();
first_arc = -1;
first_free_arc = -1;
}
void first(Node& node) const {
graph->first(node);
}
void next(Node& node) const {
graph->next(node);
}
void first(Arc& arc) const {
Node node;
first(node);
while (node != INVALID && (*nodes)[node].first_out == -1) {
next(node);
}
arc.id = (node == INVALID) ? -1 : (*nodes)[node].first_out;
}
void next(Arc& arc) const {
if (arcs[arc.id].next_out != -1) {
arc.id = arcs[arc.id].next_out;
} else {
Node node = arcs[arc.id ^ 1].target;
next(node);
while(node != INVALID && (*nodes)[node].first_out == -1) {
next(node);
}
arc.id = (node == INVALID) ? -1 : (*nodes)[node].first_out;
}
}
void first(Edge& edge) const {
Node node;
first(node);
while (node != INVALID) {
edge.id = (*nodes)[node].first_out;
while ((edge.id & 1) != 1) {
edge.id = arcs[edge.id].next_out;
}
if (edge.id != -1) {
edge.id /= 2;
return;
}
next(node);
}
edge.id = -1;
}
void next(Edge& edge) const {
Node node = arcs[edge.id * 2].target;
edge.id = arcs[(edge.id * 2) | 1].next_out;
while ((edge.id & 1) != 1) {
edge.id = arcs[edge.id].next_out;
}
if (edge.id != -1) {
edge.id /= 2;
return;
}
next(node);
while (node != INVALID) {
edge.id = (*nodes)[node].first_out;
while ((edge.id & 1) != 1) {
edge.id = arcs[edge.id].next_out;
}
if (edge.id != -1) {
edge.id /= 2;
return;
}
next(node);
}
edge.id = -1;
}
void firstOut(Arc& arc, const Node& node) const {
arc.id = (*nodes)[node].first_out;
}
void nextOut(Arc& arc) const {
arc.id = arcs[arc.id].next_out;
}
void firstIn(Arc& arc, const Node& node) const {
arc.id = (((*nodes)[node].first_out) ^ 1);
if (arc.id == -2) arc.id = -1;
}
void nextIn(Arc& arc) const {
arc.id = ((arcs[arc.id ^ 1].next_out) ^ 1);
if (arc.id == -2) arc.id = -1;
}
void firstInc(Edge &arc, bool& dir, const Node& node) const {
int de = (*nodes)[node].first_out;
if (de != -1 ) {
arc.id = de / 2;
dir = ((de & 1) == 1);
} else {
arc.id = -1;
dir = true;
}
}
void nextInc(Edge &arc, bool& dir) const {
int de = (arcs[(arc.id * 2) | (dir ? 1 : 0)].next_out);
if (de != -1 ) {
arc.id = de / 2;
dir = ((de & 1) == 1);
} else {
arc.id = -1;
dir = true;
}
}
static bool direction(Arc arc) {
return (arc.id & 1) == 1;
}
static Arc direct(Edge edge, bool dir) {
return Arc(edge.id * 2 + (dir ? 1 : 0));
}
int id(const Node& node) const { return graph->id(node); }
static int id(Arc e) { return e.id; }
static int id(Edge e) { return e.id; }
Node nodeFromId(int id) const { return graph->nodeFromId(id); }
static Arc arcFromId(int id) { return Arc(id);}
static Edge edgeFromId(int id) { return Edge(id);}
int maxNodeId() const { return graph->maxNodeId(); };
int maxEdgeId() const { return arcs.size() / 2 - 1; }
int maxArcId() const { return arcs.size()-1; }
Node source(Arc e) const { return arcs[e.id ^ 1].target; }
Node target(Arc e) const { return arcs[e.id].target; }
Node u(Edge e) const { return arcs[2 * e.id].target; }
Node v(Edge e) const { return arcs[2 * e.id + 1].target; }
typedef typename ItemSetTraits<Graph, Node>::ItemNotifier NodeNotifier;
NodeNotifier& notifier(Node) const {
return graph->notifier(Node());
}
template <typename _Value>
class NodeMap : public Graph::template NodeMap<_Value> {
public:
typedef typename _Graph::template NodeMap<_Value> Parent;
explicit NodeMap(const ListEdgeSetBase<Graph>& arcset)
: Parent(*arcset.graph) {}
NodeMap(const ListEdgeSetBase<Graph>& arcset, const _Value& value)
: Parent(*arcset.graph, value) {}
NodeMap& operator=(const NodeMap& cmap) {
return operator=<NodeMap>(cmap);
}
template <typename CMap>
NodeMap& operator=(const CMap& cmap) {
Parent::operator=(cmap);
return *this;
}
};
};
/// \ingroup semi_adaptors
///
/// \brief Graph using a node set of another digraph or graph and an
/// own edge set.
///
/// This structure can be used to establish another graph over a
/// node set of an existing one. This class uses the same Node type
/// as the underlying graph, and each valid node of the original
/// graph is valid in this arc set, therefore the node objects of
/// the original graph can be used directly with this class. The
/// node handling functions (id handling, observing, and iterators)
/// works equivalently as in the original graph.
///
/// This implementation is based on doubly-linked lists, from each
/// node the incident edges make up lists, therefore one edge can be
/// erased in constant time. It also makes possible, that node can
/// be removed from the underlying graph, in this case all edges
/// incident to the given node is erased from the arc set.
///
/// \param _Graph The type of the graph which shares its node set
/// with this class. Its interface must conform to the
/// \ref concepts::Digraph "Digraph" or \ref concepts::Graph "Graph"
/// concept.
///
/// This class is fully conform to the \ref concepts::Graph "Graph"
/// concept.
template <typename _Graph>
class ListEdgeSet : public EdgeSetExtender<ListEdgeSetBase<_Graph> > {
public:
typedef EdgeSetExtender<ListEdgeSetBase<_Graph> > Parent;
typedef typename Parent::Node Node;
typedef typename Parent::Arc Arc;
typedef typename Parent::Edge Edge;
typedef _Graph Graph;
typedef typename Parent::NodesImplBase NodesImplBase;
void eraseNode(const Node& node) {
Arc arc;
Parent::firstOut(arc, node);
while (arc != INVALID ) {
erase(arc);
Parent::firstOut(arc, node);
}
}
void clearNodes() {
Parent::clear();
}
class NodesImpl : public NodesImplBase {
public:
typedef NodesImplBase Parent;
NodesImpl(const Graph& graph, ListEdgeSet& arcset)
: Parent(graph), _arcset(arcset) {}
virtual ~NodesImpl() {}
protected:
virtual void erase(const Node& node) {
_arcset.eraseNode(node);
Parent::erase(node);
}
virtual void erase(const std::vector<Node>& nodes) {
for (int i = 0; i < int(nodes.size()); ++i) {
_arcset.eraseNode(nodes[i]);
}
Parent::erase(nodes);
}
virtual void clear() {
_arcset.clearNodes();
Parent::clear();
}
private:
ListEdgeSet& _arcset;
};
NodesImpl nodes;
public:
/// \brief Constructor of the EdgeSet.
///
/// Constructor of the EdgeSet.
ListEdgeSet(const Graph& graph) : nodes(graph, *this) {
Parent::initalize(graph, nodes);
}
/// \brief Add a new edge to the graph.
///
/// Add a new edge to the graph with node \c u
/// and node \c v endpoints.
/// \return the new edge.
Edge addEdge(const Node& u, const Node& v) {
return Parent::addEdge(u, v);
}
/// \brief Erase an edge from the graph.
///
/// Erase the edge \c e from the graph.
void erase(const Edge& e) {
return Parent::erase(e);
}
};
template <typename _Graph>
class SmartArcSetBase {
public:
typedef _Graph Graph;
typedef typename Graph::Node Node;
typedef typename Graph::NodeIt NodeIt;
protected:
struct NodeT {
int first_out, first_in;
NodeT() : first_out(-1), first_in(-1) {}
};
typedef typename ItemSetTraits<Graph, Node>::
template Map<NodeT>::Type NodesImplBase;
NodesImplBase* nodes;
struct ArcT {
Node source, target;
int next_out, next_in;
ArcT() {}
};
std::vector<ArcT> arcs;
const Graph* graph;
void initalize(const Graph& _graph, NodesImplBase& _nodes) {
graph = &_graph;
nodes = &_nodes;
}
public:
class Arc {
friend class SmartArcSetBase<Graph>;
protected:
Arc(int _id) : id(_id) {}
int id;
public:
Arc() {}
Arc(Invalid) : id(-1) {}
bool operator==(const Arc& arc) const { return id == arc.id; }
bool operator!=(const Arc& arc) const { return id != arc.id; }
bool operator<(const Arc& arc) const { return id < arc.id; }
};
SmartArcSetBase() {}
Arc addArc(const Node& u, const Node& v) {
int n = arcs.size();
arcs.push_back(ArcT());
arcs[n].next_in = (*nodes)[v].first_in;
(*nodes)[v].first_in = n;
arcs[n].next_out = (*nodes)[u].first_out;
(*nodes)[u].first_out = n;
arcs[n].source = u;
arcs[n].target = v;
return Arc(n);
}
void clear() {
Node node;
for (first(node); node != INVALID; next(node)) {
(*nodes)[node].first_in = -1;
(*nodes)[node].first_out = -1;
}
arcs.clear();
}
void first(Node& node) const {
graph->first(node);
}
void next(Node& node) const {
graph->next(node);
}
void first(Arc& arc) const {
arc.id = arcs.size() - 1;
}
void next(Arc& arc) const {
--arc.id;
}
void firstOut(Arc& arc, const Node& node) const {
arc.id = (*nodes)[node].first_out;
}
void nextOut(Arc& arc) const {
arc.id = arcs[arc.id].next_out;
}
void firstIn(Arc& arc, const Node& node) const {
arc.id = (*nodes)[node].first_in;
}
void nextIn(Arc& arc) const {
arc.id = arcs[arc.id].next_in;
}
int id(const Node& node) const { return graph->id(node); }
int id(const Arc& arc) const { return arc.id; }
Node nodeFromId(int ix) const { return graph->nodeFromId(ix); }
Arc arcFromId(int ix) const { return Arc(ix); }
int maxNodeId() const { return graph->maxNodeId(); };
int maxArcId() const { return arcs.size() - 1; }
Node source(const Arc& arc) const { return arcs[arc.id].source;}
Node target(const Arc& arc) const { return arcs[arc.id].target;}
typedef typename ItemSetTraits<Graph, Node>::ItemNotifier NodeNotifier;
NodeNotifier& notifier(Node) const {
return graph->notifier(Node());
}
template <typename _Value>
class NodeMap : public Graph::template NodeMap<_Value> {
public:
typedef typename _Graph::template NodeMap<_Value> Parent;
explicit NodeMap(const SmartArcSetBase<Graph>& arcset)
: Parent(*arcset.graph) { }
NodeMap(const SmartArcSetBase<Graph>& arcset, const _Value& value)
: Parent(*arcset.graph, value) { }
NodeMap& operator=(const NodeMap& cmap) {
return operator=<NodeMap>(cmap);
}
template <typename CMap>
NodeMap& operator=(const CMap& cmap) {
Parent::operator=(cmap);
return *this;
}
};
};
/// \ingroup semi_adaptors
///
/// \brief Digraph using a node set of another digraph or graph and
/// an own arc set.
///
/// This structure can be used to establish another directed graph
/// over a node set of an existing one. This class uses the same
/// Node type as the underlying graph, and each valid node of the
/// original graph is valid in this arc set, therefore the node
/// objects of the original graph can be used directly with this
/// class. The node handling functions (id handling, observing, and
/// iterators) works equivalently as in the original graph.
///
/// \param _Graph The type of the graph which shares its node set with
/// this class. Its interface must conform to the
/// \ref concepts::Digraph "Digraph" or \ref concepts::Graph "Graph"
/// concept.
///
/// This implementation is slightly faster than the \c ListArcSet,
/// because it uses continuous storage for arcs and it uses just
/// single-linked lists for enumerate outgoing and incoming
/// arcs. Therefore the arcs cannot be erased from the arc sets.
///
/// \warning If a node is erased from the underlying graph and this
/// node is the source or target of one arc in the arc set, then
/// the arc set is invalidated, and it cannot be used anymore. The
/// validity can be checked with the \c valid() member function.
///
/// This class is fully conform to the \ref concepts::Digraph
/// "Digraph" concept.
template <typename _Graph>
class SmartArcSet : public ArcSetExtender<SmartArcSetBase<_Graph> > {
public:
typedef ArcSetExtender<SmartArcSetBase<_Graph> > Parent;
typedef typename Parent::Node Node;
typedef typename Parent::Arc Arc;
typedef _Graph Graph;
protected:
typedef typename Parent::NodesImplBase NodesImplBase;
void eraseNode(const Node& node) {
if (typename Parent::InArcIt(*this, node) == INVALID &&
typename Parent::OutArcIt(*this, node) == INVALID) {
return;
}
throw typename NodesImplBase::Notifier::ImmediateDetach();
}
void clearNodes() {
Parent::clear();
}
class NodesImpl : public NodesImplBase {
public:
typedef NodesImplBase Parent;
NodesImpl(const Graph& graph, SmartArcSet& arcset)
: Parent(graph), _arcset(arcset) {}
virtual ~NodesImpl() {}
bool attached() const {
return Parent::attached();
}
protected:
virtual void erase(const Node& node) {
try {
_arcset.eraseNode(node);
Parent::erase(node);
} catch (const typename NodesImplBase::Notifier::ImmediateDetach&) {
Parent::clear();
throw;
}
}
virtual void erase(const std::vector<Node>& nodes) {
try {
for (int i = 0; i < int(nodes.size()); ++i) {
_arcset.eraseNode(nodes[i]);
}
Parent::erase(nodes);
} catch (const typename NodesImplBase::Notifier::ImmediateDetach&) {
Parent::clear();
throw;
}
}
virtual void clear() {
_arcset.clearNodes();
Parent::clear();
}
private:
SmartArcSet& _arcset;
};
NodesImpl nodes;
public:
/// \brief Constructor of the ArcSet.
///
/// Constructor of the ArcSet.
SmartArcSet(const Graph& graph) : nodes(graph, *this) {
Parent::initalize(graph, nodes);
}
/// \brief Add a new arc to the digraph.
///
/// Add a new arc to the digraph with source node \c s
/// and target node \c t.
/// \return the new arc.
Arc addArc(const Node& s, const Node& t) {
return Parent::addArc(s, t);
}
/// \brief Validity check
///
/// This functions gives back false if the ArcSet is
/// invalidated. It occurs when a node in the underlying graph is
/// erased and it is not isolated in the ArcSet.
bool valid() const {
return nodes.attached();
}
};
template <typename _Graph>
class SmartEdgeSetBase {
public:
typedef _Graph Graph;
typedef typename Graph::Node Node;
typedef typename Graph::NodeIt NodeIt;
protected:
struct NodeT {
int first_out;
NodeT() : first_out(-1) {}
};
typedef typename ItemSetTraits<Graph, Node>::
template Map<NodeT>::Type NodesImplBase;
NodesImplBase* nodes;
struct ArcT {
Node target;
int next_out;
ArcT() {}
};
std::vector<ArcT> arcs;
const Graph* graph;
void initalize(const Graph& _graph, NodesImplBase& _nodes) {
graph = &_graph;
nodes = &_nodes;
}
public:
class Edge {
friend class SmartEdgeSetBase;
protected:
int id;
explicit Edge(int _id) { id = _id;}
public:
Edge() {}
Edge (Invalid) { id = -1; }
bool operator==(const Edge& arc) const {return id == arc.id;}
bool operator!=(const Edge& arc) const {return id != arc.id;}
bool operator<(const Edge& arc) const {return id < arc.id;}
};
class Arc {
friend class SmartEdgeSetBase;
protected:
Arc(int _id) : id(_id) {}
int id;
public:
operator Edge() const { return edgeFromId(id / 2); }
Arc() {}
Arc(Invalid) : id(-1) {}
bool operator==(const Arc& arc) const { return id == arc.id; }
bool operator!=(const Arc& arc) const { return id != arc.id; }
bool operator<(const Arc& arc) const { return id < arc.id; }
};
SmartEdgeSetBase() {}
Edge addEdge(const Node& u, const Node& v) {
int n = arcs.size();
arcs.push_back(ArcT());
arcs.push_back(ArcT());
arcs[n].target = u;
arcs[n | 1].target = v;
arcs[n].next_out = (*nodes)[v].first_out;
(*nodes)[v].first_out = n;
arcs[n | 1].next_out = (*nodes)[u].first_out;
(*nodes)[u].first_out = (n | 1);
return Edge(n / 2);
}
void clear() {
Node node;
for (first(node); node != INVALID; next(node)) {
(*nodes)[node].first_out = -1;
}
arcs.clear();
}
void first(Node& node) const {
graph->first(node);
}
void next(Node& node) const {
graph->next(node);
}
void first(Arc& arc) const {
arc.id = arcs.size() - 1;
}
void next(Arc& arc) const {
--arc.id;
}
void first(Edge& arc) const {
arc.id = arcs.size() / 2 - 1;
}
void next(Edge& arc) const {
--arc.id;
}
void firstOut(Arc& arc, const Node& node) const {
arc.id = (*nodes)[node].first_out;
}
void nextOut(Arc& arc) const {
arc.id = arcs[arc.id].next_out;
}
void firstIn(Arc& arc, const Node& node) const {
arc.id = (((*nodes)[node].first_out) ^ 1);
if (arc.id == -2) arc.id = -1;
}
void nextIn(Arc& arc) const {
arc.id = ((arcs[arc.id ^ 1].next_out) ^ 1);
if (arc.id == -2) arc.id = -1;
}
void firstInc(Edge &arc, bool& dir, const Node& node) const {
int de = (*nodes)[node].first_out;
if (de != -1 ) {
arc.id = de / 2;
dir = ((de & 1) == 1);
} else {
arc.id = -1;
dir = true;
}
}
void nextInc(Edge &arc, bool& dir) const {
int de = (arcs[(arc.id * 2) | (dir ? 1 : 0)].next_out);
if (de != -1 ) {
arc.id = de / 2;
dir = ((de & 1) == 1);
} else {
arc.id = -1;
dir = true;
}
}
static bool direction(Arc arc) {
return (arc.id & 1) == 1;
}
static Arc direct(Edge edge, bool dir) {
return Arc(edge.id * 2 + (dir ? 1 : 0));
}
int id(Node node) const { return graph->id(node); }
static int id(Arc arc) { return arc.id; }
static int id(Edge arc) { return arc.id; }
Node nodeFromId(int id) const { return graph->nodeFromId(id); }
static Arc arcFromId(int id) { return Arc(id); }
static Edge edgeFromId(int id) { return Edge(id);}
int maxNodeId() const { return graph->maxNodeId(); };
int maxArcId() const { return arcs.size() - 1; }
int maxEdgeId() const { return arcs.size() / 2 - 1; }
Node source(Arc e) const { return arcs[e.id ^ 1].target; }
Node target(Arc e) const { return arcs[e.id].target; }
Node u(Edge e) const { return arcs[2 * e.id].target; }
Node v(Edge e) const { return arcs[2 * e.id + 1].target; }
typedef typename ItemSetTraits<Graph, Node>::ItemNotifier NodeNotifier;
NodeNotifier& notifier(Node) const {
return graph->notifier(Node());
}
template <typename _Value>
class NodeMap : public Graph::template NodeMap<_Value> {
public:
typedef typename _Graph::template NodeMap<_Value> Parent;
explicit NodeMap(const SmartEdgeSetBase<Graph>& arcset)
: Parent(*arcset.graph) { }
NodeMap(const SmartEdgeSetBase<Graph>& arcset, const _Value& value)
: Parent(*arcset.graph, value) { }
NodeMap& operator=(const NodeMap& cmap) {
return operator=<NodeMap>(cmap);
}
template <typename CMap>
NodeMap& operator=(const CMap& cmap) {
Parent::operator=(cmap);
return *this;
}
};
};
/// \ingroup semi_adaptors
///
/// \brief Graph using a node set of another digraph or graph and an
/// own edge set.
///
/// This structure can be used to establish another graph over a
/// node set of an existing one. This class uses the same Node type
/// as the underlying graph, and each valid node of the original
/// graph is valid in this arc set, therefore the node objects of
/// the original graph can be used directly with this class. The
/// node handling functions (id handling, observing, and iterators)
/// works equivalently as in the original graph.
///
/// \param _Graph The type of the graph which shares its node set
/// with this class. Its interface must conform to the
/// \ref concepts::Digraph "Digraph" or \ref concepts::Graph "Graph"
/// concept.
///
/// This implementation is slightly faster than the \c ListEdgeSet,
/// because it uses continuous storage for edges and it uses just
/// single-linked lists for enumerate incident edges. Therefore the
/// edges cannot be erased from the edge sets.
///
/// \warning If a node is erased from the underlying graph and this
/// node is incident to one edge in the edge set, then the edge set
/// is invalidated, and it cannot be used anymore. The validity can
/// be checked with the \c valid() member function.
///
/// This class is fully conform to the \ref concepts::Graph
/// "Graph" concept.
template <typename _Graph>
class SmartEdgeSet : public EdgeSetExtender<SmartEdgeSetBase<_Graph> > {
public:
typedef EdgeSetExtender<SmartEdgeSetBase<_Graph> > Parent;
typedef typename Parent::Node Node;
typedef typename Parent::Arc Arc;
typedef typename Parent::Edge Edge;
typedef _Graph Graph;
protected:
typedef typename Parent::NodesImplBase NodesImplBase;
void eraseNode(const Node& node) {
if (typename Parent::IncEdgeIt(*this, node) == INVALID) {
return;
}
throw typename NodesImplBase::Notifier::ImmediateDetach();
}
void clearNodes() {
Parent::clear();
}
class NodesImpl : public NodesImplBase {
public:
typedef NodesImplBase Parent;
NodesImpl(const Graph& graph, SmartEdgeSet& arcset)
: Parent(graph), _arcset(arcset) {}
virtual ~NodesImpl() {}
bool attached() const {
return Parent::attached();
}
protected:
virtual void erase(const Node& node) {
try {
_arcset.eraseNode(node);
Parent::erase(node);
} catch (const typename NodesImplBase::Notifier::ImmediateDetach&) {
Parent::clear();
throw;
}
}
virtual void erase(const std::vector<Node>& nodes) {
try {
for (int i = 0; i < int(nodes.size()); ++i) {
_arcset.eraseNode(nodes[i]);
}
Parent::erase(nodes);
} catch (const typename NodesImplBase::Notifier::ImmediateDetach&) {
Parent::clear();
throw;
}
}
virtual void clear() {
_arcset.clearNodes();
Parent::clear();
}
private:
SmartEdgeSet& _arcset;
};
NodesImpl nodes;
public:
/// \brief Constructor of the EdgeSet.
///
/// Constructor of the EdgeSet.
SmartEdgeSet(const Graph& graph) : nodes(graph, *this) {
Parent::initalize(graph, nodes);
}
/// \brief Add a new edge to the graph.
///
/// Add a new edge to the graph with node \c u
/// and node \c v endpoints.
/// \return the new edge.
Edge addEdge(const Node& u, const Node& v) {
return Parent::addEdge(u, v);
}
/// \brief Validity check
///
/// This functions gives back false if the EdgeSet is
/// invalidated. It occurs when a node in the underlying graph is
/// erased and it is not isolated in the EdgeSet.
bool valid() const {
return nodes.attached();
}
};
}
#endif
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