#include "mtp_graph.h"
+#include <cmath>
#include <float.h>
using namespace std;
class Vertex {
public:
- Edge *leaving_edges;
scalar_t distance_from_source;
Edge *pred_edge_toward_source;
+
+ Edge *leaving_edge_list_root;
Vertex **heap_slot;
Vertex();
//////////////////////////////////////////////////////////////////////
Vertex::Vertex() {
- leaving_edges = 0;
+ leaving_edge_list_root = 0;
}
void Vertex::add_leaving_edge(Edge *e) {
- e->next_leaving_edge = leaving_edges;
+ e->next_leaving_edge = leaving_edge_list_root;
e->pred_leaving_edge = 0;
- if(leaving_edges) { leaving_edges->pred_leaving_edge = e; }
- leaving_edges = e;
+ if(leaving_edge_list_root) {
+ leaving_edge_list_root->pred_leaving_edge = e;
+ }
+ leaving_edge_list_root = e;
}
void Vertex::del_leaving_edge(Edge *e) {
- if(e == leaving_edges) {
- leaving_edges = e->next_leaving_edge;
+ if(e == leaving_edge_list_root) {
+ leaving_edge_list_root = e->next_leaving_edge;
}
if(e->pred_leaving_edge) {
e->pred_leaving_edge->next_leaving_edge = e->next_leaving_edge;
//////////////////////////////////////////////////////////////////////
-static int compare_vertex(const void *v1, const void *v2) {
- scalar_t delta =
- (*((Vertex **) v1))->distance_from_source -
- (*((Vertex **) v2))->distance_from_source;
- if(delta < 0) return -1;
- else if(delta > 0) return 1;
- else return 0;
-}
-
MTPGraph::MTPGraph(int nb_vertices, int nb_edges,
int *vertex_from, int *vertex_to,
int source, int sink) {
_sink = &_vertices[sink];
for(int e = 0; e < nb_edges; e++) {
- _vertices[vertex_from[e]].add_leaving_edge(_edges + e);
+ _vertices[vertex_from[e]].add_leaving_edge(&_edges[e]);
_edges[e].occupied = 0;
- _edges[e].origin_vertex = _vertices + vertex_from[e];
- _edges[e].terminal_vertex = _vertices + vertex_to[e];
+ _edges[e].origin_vertex = &_vertices[vertex_from[e]];
+ _edges[e].terminal_vertex = &_vertices[vertex_to[e]];
}
for(int v = 0; v < _nb_vertices; v++) {
paths = 0;
nb_paths = 0;
- if(compute_dp_ranks()) {
- // Here the distance_from_source field of every vertex is the
- // number of DP iterations needed to update it. Hence we only have
- // to process the vertex in that order.
- for(int v = 0; v < _nb_vertices; v++) { _dp_order[v] = &_vertices[v]; }
- qsort(_dp_order, _nb_vertices, sizeof(Vertex *), compare_vertex);
- } else {
- cerr << __FILE__ << ": This graph is not a DAG." << endl;
- abort();
- }
+ compute_dp_ordering();
}
MTPGraph::~MTPGraph() {
delete[] paths;
}
-int MTPGraph::compute_dp_ranks() {
- Vertex *v;
- Edge *e;
-
- // This procedure computes for each node the longest link from the
- // source and abort if the graph is not a DAG. It works by removing
- // successively nodes without predecessor: At the first iteration it
- // removes the source, then the nodes with incoming edge only from
- // the source, etc. If it can remove all the nodes that way, the
- // graph is a DAG. If at some point it can not remove node anymore
- // and there are some remaining nodes, the graph is not a DAG. The
- // rank of a node is the iteration at which is it removed, and we
- // set the distance_from_source fields to this value.
-
- Vertex **active = new Vertex *[_nb_vertices];
-
- // All the nodes are active at first
- for(int k = 0; k < _nb_vertices; k++) {
- _vertices[k].distance_from_source = 0;
- active[k] = &_vertices[k];
- }
-
- scalar_t rank = 1;
- int nb_active = _nb_vertices, pred_nb_active;
-
- do {
- // We set the distance_from_source field of all the vertices with incoming
- // edges to the current rank value
- for(int f = 0; f < nb_active; f++) {
- v = active[f];
- for(e = v->leaving_edges; e; e = e->next_leaving_edge) {
- e->terminal_vertex->distance_from_source = rank;
- }
- }
-
- pred_nb_active = nb_active;
- nb_active = 0;
-
- // We keep all the vertices with incoming nodes
- for(int f = 0; f < pred_nb_active; f++) {
- v = active[f];
- if(v->distance_from_source == rank) {
- active[nb_active++] = v;
- }
- }
-
- rank++;
- } while(nb_active < pred_nb_active);
-
- delete[] active;
-
- return nb_active == 0;
-}
-
//////////////////////////////////////////////////////////////////////
void MTPGraph::print(ostream *os) {
for(int k = 0; k < _nb_edges; k++) {
- Edge *e = _edges + k;
+ Edge *e = &_edges[k];
(*os) << e->origin_vertex - _vertices
- << " -> "
- << e->terminal_vertex - _vertices
- << " "
- << e->length;
- if(e->occupied) {
- (*os) << " *";
- }
+ << " -> "
+ << e->terminal_vertex - _vertices
+ << " (" << e->length << ")";
+ if(e->occupied) { (*os) << " *"; }
(*os) << endl;
}
}
(*os) << " " << _source - _vertices << " [peripheries=2];" << endl;
(*os) << " " << _sink - _vertices << " [peripheries=2];" << endl;
for(int k = 0; k < _nb_edges; k++) {
- Edge *e = _edges + k;
+ Edge *e = &_edges[k];
(*os) << " "
<< e->origin_vertex - _vertices
<< " -> "
void MTPGraph::update_positivized_lengths() {
for(int k = 0; k < _nb_edges; k++) {
- Edge *e = _edges + k;
+ Edge *e = &_edges[k];
e->positivized_length +=
e->origin_vertex->distance_from_source - e->terminal_vertex->distance_from_source;
}
scalar_t max_error = 0.0;
#endif
for(int k = 0; k < _nb_edges; k++) {
- Edge *e = _edges + k;
+ Edge *e = &_edges[k];
if(e->positivized_length < 0) {
-
#ifdef VERBOSE
residual_error -= e->positivized_length;
max_error = max(max_error, - e->positivized_length);
for(int k = 0; k < _nb_vertices; k++) {
v = _dp_order[k];
- for(e = v->leaving_edges; e; e = e->next_leaving_edge) {
+ for(e = v->leaving_edge_list_root; e; e = e->next_leaving_edge) {
d = v->distance_from_source + e->positivized_length;
tv = e->terminal_vertex;
if(d < tv->distance_from_source) {
tv->distance_from_source = d;
tv->pred_edge_toward_source = e;
- tv->decrease_distance_in_heap(_heap);
}
}
}
// pred_edge_toward_source.
void MTPGraph::find_shortest_path() {
- Vertex *v, *tv, **a, **b;
+ Vertex *v, *tv, **last_slot;
Edge *e;
scalar_t d;
// Get the closest to the source
v = _heap[0];
- // Remove it from the heap (swap it with the last in the heap, and
+ // Remove it from the heap (swap it with the last_slot in the heap, and
// update the distance of that one)
_heap_size--;
- a = _heap;
- b = _heap + _heap_size;
- swap(*a, *b); swap((*a)->heap_slot, (*b)->heap_slot);
+ last_slot = _heap + _heap_size;
+ swap(*_heap, *last_slot); swap((*_heap)->heap_slot, (*last_slot)->heap_slot);
_heap[0]->increase_distance_in_heap(_heap, _heap + _heap_size);
- // Now update the neighbors of the currently closest to the source
- for(e = v->leaving_edges; e; e = e->next_leaving_edge) {
+ // Now update the neighbors of the node currently closest to the
+ // source
+ for(e = v->leaving_edge_list_root; e; e = e->next_leaving_edge) {
d = v->distance_from_source + e->positivized_length;
tv = e->terminal_vertex;
if(d < tv->distance_from_source) {
}
void MTPGraph::find_best_paths(scalar_t *lengths) {
- scalar_t total_length;
+ scalar_t shortest_path_length;
Vertex *v;
Edge *e;
_edges[e].positivized_length = _edges[e].length;
}
- // Compute the distance of every node from the source by just
+ // Compute the distance of all the nodes from the source by just
// visiting them in the proper DAG ordering we computed when
// building the graph
dp_compute_distances();
find_shortest_path();
- total_length = 0.0;
+ shortest_path_length = 0.0;
// Do we reach the sink?
if(_sink->pred_edge_toward_source) {
// original edge lengths
v = _sink;
while(v->pred_edge_toward_source) {
- total_length += v->pred_edge_toward_source->length;
+ shortest_path_length += v->pred_edge_toward_source->length;
v = v->pred_edge_toward_source->origin_vertex;
}
// If that length is negative
- if(total_length < 0.0) {
+ if(shortest_path_length < 0.0) {
#ifdef VERBOSE
- cerr << __FILE__ << ": Found a path of length " << total_length << endl;
+ cerr << __FILE__ << ": Found a path of length " << shortest_path_length << endl;
#endif
// Invert all the edges along the best path
v = _sink;
}
}
- } while(total_length < 0.0);
+ } while(shortest_path_length < 0.0);
// Put back the graph in its original state (i.e. invert edges which
// have been inverted in the process)
for(int k = 0; k < _nb_edges; k++) {
- e = _edges + k;
+ e = &_edges[k];
if(e->occupied) { e->invert(); }
}
}
int l = 0, nb_occupied_next;
if(path) {
- path->nodes[l++] = e->origin_vertex - _vertices;
+ path->nodes[l++] = int(e->origin_vertex - _vertices);
path->length = e->length;
} else l++;
while(e->terminal_vertex != _sink) {
if(path) {
- path->nodes[l++] = e->terminal_vertex - _vertices;
+ path->nodes[l++] = int(e->terminal_vertex - _vertices);
path->length += e->length;
} else l++;
nb_occupied_next = 0;
- for(f = e->terminal_vertex->leaving_edges; f; f = f->next_leaving_edge) {
+ for(f = e->terminal_vertex->leaving_edge_list_root; f; f = f->next_leaving_edge) {
if(f->occupied) { nb_occupied_next++; next = f; }
}
}
if(path) {
- path->nodes[l++] = e->terminal_vertex - _vertices;
+ path->nodes[l++] = int(e->terminal_vertex - _vertices);
path->length += e->length;
} else l++;
return l;
}
+//////////////////////////////////////////////////////////////////////
+
+static int compare_vertices_on_distance(const void *v1, const void *v2) {
+ scalar_t delta =
+ (*((Vertex **) v1))->distance_from_source -
+ (*((Vertex **) v2))->distance_from_source;
+ if(delta < 0) return -1;
+ else if(delta > 0) return 1;
+ else return 0;
+}
+
+void MTPGraph::compute_dp_ordering() {
+ Vertex *v;
+ Edge *e;
+ int ntv;
+
+ // This method computes for each node the length of the longest link
+ // from the source, and orders the node in _dp_order according to
+ // it. It aborts if the graph is not a DAG.
+
+ int *nb_predecessors = new int[_nb_vertices];
+
+ Vertex **already_processed = _dp_order, **front = _dp_order, **new_front = _dp_order;
+
+ for(int k = 0; k < _nb_vertices; k++) {
+ nb_predecessors[k] = 0;
+ }
+
+ for(int k = 0; k < _nb_vertices; k++) {
+ v = &_vertices[k];
+ for(e = v->leaving_edge_list_root; e; e = e->next_leaving_edge) {
+ ntv = int(e->terminal_vertex - _vertices);
+ nb_predecessors[ntv]++;
+ }
+ }
+
+ for(int k = 0; k < _nb_vertices; k++) {
+ if(nb_predecessors[k] == 0) {
+ *(front++) = _vertices + k;
+ }
+ }
+
+ scalar_t rank = 1;
+ while(already_processed < front) {
+ new_front = front;
+ while(already_processed < front) {
+ v = *(already_processed++);
+ v->distance_from_source = rank;
+ for(e = v->leaving_edge_list_root; e; e = e->next_leaving_edge) {
+ ntv = int(e->terminal_vertex - _vertices);
+ nb_predecessors[ntv]--;
+ ASSERT(nb_predecessors[ntv] >= 0);
+ if(nb_predecessors[ntv] == 0) {
+ *(new_front++) = e->terminal_vertex;
+ }
+ }
+ }
+ front = new_front;
+ rank++;
+ }
+
+ if(already_processed < _dp_order + _nb_vertices) {
+ cerr << __FILE__ << ": The graph is not a DAG." << endl;
+ abort();
+ }
+
+ delete[] nb_predecessors;
+
+ for(int v = 0; v < _nb_vertices; v++) { _dp_order[v] = &_vertices[v]; }
+ qsort(_dp_order, _nb_vertices, sizeof(Vertex *), compare_vertices_on_distance);
+}
+
+//////////////////////////////////////////////////////////////////////
+
void MTPGraph::retrieve_disjoint_paths() {
Edge *e;
int p, l;
delete[] paths;
nb_paths = 0;
- for(e = _source->leaving_edges; e; e = e->next_leaving_edge) {
+ for(e = _source->leaving_edge_list_root; e; e = e->next_leaving_edge) {
if(e->occupied) { nb_paths++; }
}
paths = new Path *[nb_paths];
p = 0;
- for(e = _source->leaving_edges; e; e = e->next_leaving_edge) {
+ for(e = _source->leaving_edge_list_root; e; e = e->next_leaving_edge) {
if(e->occupied) {
l = retrieve_one_path(e, 0);
paths[p] = new Path(l);