lemon-0.x: comparison src/work/jacint/dijkstra.hh

equal deleted inserted replaced

--1:000000000000
+:bc253414aa1e
+/*
+*dijkstra
+*by jacint
+*Performs Dijkstra's algorithm from node s.
+*
+*Constructor:
+*
+*dijkstra(graph_type& G, node_iterator s, edge_property_vector& distance)
+*
+*
+*
+*Member functions:
+*
+*void run()
+*
+*  The following function should be used after run() was already run.
+*
+*
+*T dist(node_iterator v) : returns the distance from s to v.
+*   It is 0 if v is not reachable from s.
+*
+*
+*edge_iterator pred(node_iterator v)
+*   Returns the last edge of a shortest s-v path.
+*   Returns an invalid iterator if v=s or v is not
+*   reachable from s.
+*
+*
+*bool reach(node_iterator v) : true if v is reachable from s
+*
+*
+*
+*
+*
+*Problems:
+*
+*Heap implementation is needed, because the priority queue of stl
+*does not have a mathod for key-decrease, so we had to use here a
+*g\'any solution.
+*
+*The implementation of infinity would be desirable, see after line 100.
+*/
+#ifndef DIJKSTRA_HH
+#define DIJKSTRA_HH
+#include <queue>
+#include <algorithm>
+#include <marci_graph_traits.hh>
+#include <marci_property_vector.hh>
+namespace std {
+namespace marci {
+template <typename graph_type, typename T>
+class dijkstra{
+typedef typename graph_traits<graph_type>::node_iterator node_iterator;
+typedef typename graph_traits<graph_type>::edge_iterator edge_iterator;
+typedef typename graph_traits<graph_type>::each_node_iterator each_node_iterator;
+typedef typename graph_traits<graph_type>::in_edge_iterator in_edge_iterator;
+typedef typename graph_traits<graph_type>::out_edge_iterator out_edge_iterator;
+graph_type& G;
+node_iterator s;
+node_property_vector<graph_type, edge_iterator> predecessor;
+node_property_vector<graph_type, T> distance;
+edge_property_vector<graph_type, T> length;
+node_property_vector<graph_type, bool> reached;
+public :
+/*
+The distance of all the nodes is 0.
+*/
+dijkstra(graph_type& _G, node_iterator _s, edge_property_vector<graph_type, T>& _length) :
+G(_G), s(_s), predecessor(G, 0), distance(G, 0), length(_length), reached(G, false) { }
+/*By Misi.*/
+struct node_dist_comp
+{
+	node_property_vector<graph_type, T> &d;
+	node_dist_comp(node_property_vector<graph_type, T> &_d) : d(_d) {}
+	bool operator()(const node_iterator& u, const node_iterator& v) const
+	{ return d.get(u) < d.get(v); }
+};
+void run() {
+	node_property_vector<graph_type, bool> scanned(G, false);
+	std::priority_queue<node_iterator, vector<node_iterator>, node_dist_comp>
+	  heap(( node_dist_comp(distance) ));
+	heap.push(s);
+	reached.put(s, true);
+	while (!heap.empty()) {
+	  node_iterator v=heap.top();
+	  heap.pop();
+	  if (!scanned.get(v)) {
+	    for(out_edge_iterator e=G.first_out_edge(v); e.valid(); ++e) {
+	      node_iterator w=G.head(e);
+	      if (!scanned.get(w)) {
+		if (!reached.get(w)) {
+		  reached.put(w,true);
+		  distance.put(w, distance.get(v)-length.get(e));
+		  predecessor.put(w,e);
+		} else if (distance.get(v)-length.get(e)>distance.get(w)) {
+		  distance.put(w, distance.get(v)-length.get(e));
+		  predecessor.put(w,e);
+		}
+		heap.push(w);
+	      }
+	    }
+	    scanned.put(v,true);
+	  } // if (!scanned.get(v))
+	} // while (!heap.empty())
+} //void run()
+/*
+*Returns the distance of the node v.
+*It is 0 for the root and for the nodes not
+*reachable form the root.
+*/
+T dist(node_iterator v) {
+	return -distance.get(v);
+}
+/*
+*  Returns the last edge of a shortest s-v path.
+*  Returns an invalid iterator if v=root or v is not
+*  reachable from the root.
+*/
+edge_iterator pred(node_iterator v) {
+	if (v!=s) { return predecessor.get(v);}
+	else {return edge_iterator();}
+}
+bool reach(node_iterator v) {
+	return reached.get(v);
+}
+};// class dijkstra
+} // namespace marci
+}
+#endif //DIJKSTRA_HH

changeset 50	e125f12784e2
child 78	ecc1171307be