X-Git-Url: https://fleuret.org/cgi-bin/gitweb/gitweb.cgi?p=mtp.git;a=blobdiff_plain;f=mtp_graph.cc;h=dc383210e450711218fc69232d112320d61acc28;hp=343ebf79a60a98d145138891d286ec70915280e0;hb=23dae2d97cfbc14f63d3d2c9050d3d4f1ef7bd66;hpb=9aa2c8c57bbe0ac533d081fa3917aa037e65c766 diff --git a/mtp_graph.cc b/mtp_graph.cc index 343ebf7..dc38321 100644 --- a/mtp_graph.cc +++ b/mtp_graph.cc @@ -24,6 +24,7 @@ #include "mtp_graph.h" +#include #include using namespace std; @@ -43,9 +44,10 @@ public: 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(); @@ -53,7 +55,7 @@ public: inline void add_leaving_edge(Edge *e); inline void del_leaving_edge(Edge *e); inline void decrease_distance_in_heap(Vertex **heap); - inline void increase_distance_in_heap(Vertex **heap, int heap_size); + inline void increase_distance_in_heap(Vertex **heap, Vertex **heap_bottom); }; ////////////////////////////////////////////////////////////////////// @@ -63,27 +65,27 @@ void Edge::invert() { positivized_length = - positivized_length; origin_vertex->del_leaving_edge(this); terminal_vertex->add_leaving_edge(this); - Vertex *t = terminal_vertex; - terminal_vertex = origin_vertex; - origin_vertex = t; + swap(terminal_vertex, origin_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; @@ -106,18 +108,18 @@ void Vertex::decrease_distance_in_heap(Vertex **heap) { } } -void Vertex::increase_distance_in_heap(Vertex **heap, int heap_size) { +void Vertex::increase_distance_in_heap(Vertex **heap, Vertex **heap_bottom) { Vertex **c1, **c2, **h; // omg, that's beautiful h = heap_slot; while(c1 = heap + 2 * (h - heap) + 1, - c1 < heap + heap_size && + c1 < heap_bottom && (c2 = c1 + 1, (*c1)->distance_from_source < (*h)->distance_from_source || - (c2 < heap + heap_size && (*c2)->distance_from_source < (*h)->distance_from_source) + (c2 < heap_bottom && (*c2)->distance_from_source < (*h)->distance_from_source) )) { - if(c2 < heap + heap_size && (*c2)->distance_from_source <= (*c1)->distance_from_source) { + if(c2 < heap_bottom && (*c2)->distance_from_source <= (*c1)->distance_from_source) { swap(*c2, *h); swap((*c2)->heap_slot, (*h)->heap_slot); h = c2; @@ -131,7 +133,7 @@ void Vertex::increase_distance_in_heap(Vertex **heap, int heap_size) { ////////////////////////////////////////////////////////////////////// -static int compare_vertex(const void *v1, const void *v2) { +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; @@ -140,6 +142,8 @@ static int compare_vertex(const void *v1, const void *v2) { else return 0; } +////////////////////////////////////////////////////////////////////// + MTPGraph::MTPGraph(int nb_vertices, int nb_edges, int *vertex_from, int *vertex_to, int source, int sink) { @@ -169,16 +173,9 @@ MTPGraph::MTPGraph(int nb_vertices, int nb_edges, 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_ranks(); + for(int v = 0; v < _nb_vertices; v++) { _dp_order[v] = &_vertices[v]; } + qsort(_dp_order, _nb_vertices, sizeof(Vertex *), compare_vertices_on_distance); } MTPGraph::~MTPGraph() { @@ -192,17 +189,73 @@ MTPGraph::~MTPGraph() { ////////////////////////////////////////////////////////////////////// +void 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 **with_predecessor = new Vertex *[_nb_vertices]; + + // All the nodes are with_predecessor at first + for(int k = 0; k < _nb_vertices; k++) { + _vertices[k].distance_from_source = 0; + with_predecessor[k] = &_vertices[k]; + } + + scalar_t rank = 1; + int nb_with_predecessor = _nb_vertices, pred_nb_with_predecessor; + + 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_with_predecessor; f++) { + v = with_predecessor[f]; + for(e = v->leaving_edge_list_root; e; e = e->next_leaving_edge) { + e->terminal_vertex->distance_from_source = rank; + } + } + + pred_nb_with_predecessor = nb_with_predecessor; + nb_with_predecessor = 0; + + // We keep all the vertices with incoming nodes + for(int f = 0; f < pred_nb_with_predecessor; f++) { + v = with_predecessor[f]; + if(v->distance_from_source == rank) { + with_predecessor[nb_with_predecessor++] = v; + } + } + + rank++; + } while(nb_with_predecessor < pred_nb_with_predecessor); + + delete[] with_predecessor; + + if(nb_with_predecessor > 0) { + cerr << __FILE__ << ": The graph is not a DAG." << endl; + abort(); + } +} + +////////////////////////////////////////////////////////////////////// + void MTPGraph::print(ostream *os) { for(int k = 0; k < _nb_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; } } @@ -248,7 +301,6 @@ void MTPGraph::force_positivized_lengths() { Edge *e = _edges + k; if(e->positivized_length < 0) { - #ifdef VERBOSE residual_error -= e->positivized_length; max_error = max(max_error, - e->positivized_length); @@ -261,60 +313,6 @@ void MTPGraph::force_positivized_lengths() { #endif } -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::dp_compute_distances() { Vertex *v, *tv; Edge *e; @@ -329,13 +327,12 @@ void MTPGraph::dp_compute_distances() { 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); } } } @@ -346,7 +343,7 @@ void MTPGraph::dp_compute_distances() { // pred_edge_toward_source. void MTPGraph::find_shortest_path() { - Vertex *v, *tv, **a, **b; + Vertex *v, *tv, **last_slot; Edge *e; scalar_t d; @@ -363,16 +360,16 @@ void MTPGraph::find_shortest_path() { // 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); - _heap[0]->increase_distance_in_heap(_heap, _heap_size); + 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) { @@ -386,7 +383,7 @@ void MTPGraph::find_shortest_path() { } void MTPGraph::find_best_paths(scalar_t *lengths) { - scalar_t total_length; + scalar_t shortest_path_length; Vertex *v; Edge *e; @@ -396,15 +393,21 @@ void MTPGraph::find_best_paths(scalar_t *lengths) { _edges[e].positivized_length = _edges[e].length; } - // Update the distances to the source in "good order" + // 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(); do { + // Use the current distance from the source to make all edge + // lengths positive update_positivized_lengths(); + // Fix numerical errors force_positivized_lengths(); + find_shortest_path(); - total_length = 0.0; + shortest_path_length = 0.0; // Do we reach the sink? if(_sink->pred_edge_toward_source) { @@ -412,13 +415,13 @@ void MTPGraph::find_best_paths(scalar_t *lengths) { // 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; @@ -433,7 +436,7 @@ void MTPGraph::find_best_paths(scalar_t *lengths) { } } - } 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) @@ -459,7 +462,7 @@ int MTPGraph::retrieve_one_path(Edge *e, Path *path) { } 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; } } @@ -494,14 +497,14 @@ void MTPGraph::retrieve_disjoint_paths() { 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);