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# Testing connectivity in undirected Graph (using DFS)

I need to test which vertex is "important", where when a connected edge is removed, graph becomes disconnected. So my idea was try removing each edge then test the connectivity from 1 node to the other.

Example: Remove edge connecting 2 - 5. Then test connectivity from 2 - 5: `isConnected(2,5)`

``````  // DFS from node1 to node2
boolean isConnected(int node1, int node2) {
// keep track of (visited) status of nodes
visited = new VertexState[V];
for (int i = 0; i < V; i++)
visited[i] = VertexState.NotVisited;

// recursively test connectivity
return _isConnected(node1, node2);
}

boolean _isConnected(int node1, int node2) {
visited[node1] = VertexState.Visiting;
if (node1 == node2) { // we found the node
return true;
} else {
for (int i = 0; i < V; i++) { // for all children of node1
if (AdjMatrix[node1][i] == 1 && visited[i] == VertexState.NotVisited) {
if (_isConnected(i, node2)) { // test if child can reach node2
return true;
}
}
}
visited[node1] = VertexState.Visited;
}
return false;
}
``````

When I try it out with a simple graph, it works,but when I test it with a complex test case, it appears to produce wrong results. I have difficulties debugging as its a complex test case and can't draw it out.

UPDATE

If it helps just the pseudocode:

``````isConnected(node1, node2)
visited = new VertexState[V]
for each v in visited
v = NotVisited
return _isConnected(node1, node2); // the recursion

_isConnected(node1, node2)
visited[node1] = Visiting
if (node1 == node2)
return true // we found the node
else
for each neighbour of node1
if visited[neighbour] == NotVisited
if_isConnected(neighbour, node2)
return true
visited[node1] = Visited
return false
``````

UPDATE 2

Full source https://gist.github.com/3779445, but with Adjacency List instead, it appears to work ... Not sure if its the most efficient algorithm tho ...

-
Is the adjacency matrix symmetric ? Please include the entire program (including how the adjacency matrix is constructed). – krjampani Sep 24 '12 at 15:26
@krjampani, updated with full source, just that I think that 1 works fine already ... – Jiew Meng Sep 25 '12 at 1:31
@JiewMeng Does it work fine when the graph has a cycle, or a node passes itself as a neighbor? – fayyazkl Sep 25 '12 at 7:05
this statement where when a connected edge is removed, graph becomes disconnected is not accurate! did you mean when a connected vertex is removed the graph becomes disconnected? because an edge must be connected between two nodes. In hyper graphs, an edge can connect more than two nodes, but at least an edge must be between two nodes. – user1406062 Oct 3 '12 at 10:18
@user1406062: paraphrase the statement as 'when an edge is removed, the number of (weakly) connected components increases' and it should be well-defined. – collapsar Feb 13 '13 at 15:17