diff -r 7f6e2bd76654 -r 141f9c0db4a3 test/connectivity_test.cc --- a/test/connectivity_test.cc Wed Mar 17 12:35:52 2010 +0100 +++ b/test/connectivity_test.cc Sat Mar 06 14:35:12 2010 +0000 @@ -2,7 +2,7 @@ * * This file is a part of LEMON, a generic C++ optimization library. * - * Copyright (C) 2003-2009 + * Copyright (C) 2003-2010 * Egervary Jeno Kombinatorikus Optimalizalasi Kutatocsoport * (Egervary Research Group on Combinatorial Optimization, EGRES). * @@ -29,12 +29,12 @@ { typedef ListDigraph Digraph; typedef Undirector Graph; - + { Digraph d; Digraph::NodeMap order(d); Graph g(d); - + check(stronglyConnected(d), "The empty digraph is strongly connected"); check(countStronglyConnectedComponents(d) == 0, "The empty digraph has 0 strongly connected component"); @@ -48,7 +48,7 @@ check(biEdgeConnected(g), "The empty graph is bi-edge-connected"); check(countBiEdgeConnectedComponents(g) == 0, "The empty graph has 0 bi-edge-connected component"); - + check(dag(d), "The empty digraph is DAG."); check(checkedTopologicalSort(d, order), "The empty digraph is DAG."); check(loopFree(d), "The empty digraph is loop-free."); @@ -82,7 +82,7 @@ check(biEdgeConnected(g), "This graph is bi-edge-connected"); check(countBiEdgeConnectedComponents(g) == 1, "This graph has 1 bi-edge-connected component"); - + check(dag(d), "This digraph is DAG."); check(checkedTopologicalSort(d, order), "This digraph is DAG."); check(loopFree(d), "This digraph is loop-free."); @@ -101,14 +101,14 @@ Digraph d; Digraph::NodeMap order(d); Graph g(d); - + Digraph::Node n1 = d.addNode(); Digraph::Node n2 = d.addNode(); Digraph::Node n3 = d.addNode(); Digraph::Node n4 = d.addNode(); Digraph::Node n5 = d.addNode(); Digraph::Node n6 = d.addNode(); - + d.addArc(n1, n3); d.addArc(n3, n2); d.addArc(n2, n1); @@ -136,23 +136,23 @@ check(loopFree(g), "This graph is loop-free."); check(!parallelFree(g), "This graph is not parallel-free."); check(!simpleGraph(g), "This graph is not simple."); - + d.addArc(n3, n3); - + check(!loopFree(d), "This digraph is not loop-free."); check(!loopFree(g), "This graph is not loop-free."); check(!simpleGraph(d), "This digraph is not simple."); - + d.addArc(n3, n2); - + check(!parallelFree(d), "This digraph is not parallel-free."); } - + { Digraph d; Digraph::ArcMap cutarcs(d, false); Graph g(d); - + Digraph::Node n1 = d.addNode(); Digraph::Node n2 = d.addNode(); Digraph::Node n3 = d.addNode(); @@ -172,7 +172,7 @@ d.addArc(n1, n8); d.addArc(n6, n7); d.addArc(n7, n6); - + check(!stronglyConnected(d), "This digraph is not strongly connected"); check(countStronglyConnectedComponents(d) == 3, "This digraph has 3 strongly connected components"); @@ -235,7 +235,7 @@ // (T. H. Cormen, C. E. Leiserson, R. L. Rivest, C. Stein) Digraph d; Digraph::NodeMap order(d); - + Digraph::Node belt = d.addNode(); Digraph::Node trousers = d.addNode(); Digraph::Node necktie = d.addNode(); @@ -255,7 +255,7 @@ d.addArc(shirt, belt); d.addArc(shirt, necktie); d.addArc(necktie, coat); - + check(dag(d), "This digraph is DAG."); topologicalSort(d, order); for (Digraph::ArcIt a(d); a != INVALID; ++a) { @@ -267,7 +267,7 @@ { ListGraph g; ListGraph::NodeMap map(g); - + ListGraph::Node n1 = g.addNode(); ListGraph::Node n2 = g.addNode(); ListGraph::Node n3 = g.addNode(); @@ -283,10 +283,10 @@ g.addEdge(n4, n6); g.addEdge(n4, n7); g.addEdge(n5, n7); - + check(bipartite(g), "This graph is bipartite"); check(bipartitePartitions(g, map), "This graph is bipartite"); - + check(map[n1] == map[n2] && map[n1] == map[n6] && map[n1] == map[n7], "Wrong bipartitePartitions()"); check(map[n3] == map[n4] && map[n3] == map[n5],