# Finding all unique paths in an undirected graph

I have a problem where I need to search for all unique paths in an undirected graph of degree <=4. The graph is basically a grid, and all connections are between direct neighbors only (4-way).

• A path cannot visit the same vertex more than once.
• A path can visit any number of vertices to make a path.
• A path contains at least 2 vertices.

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Is this a connected graph? –  Argote Apr 4 '11 at 8:34
I can't understand the meaning of unique path, buy your definition I think there are at most 4*n unique path, each path is one edge. –  Saeed Amiri Apr 4 '11 at 8:41
I believe the graph is connected (all vertices can be reached) –  Plenilune Apr 4 '11 at 8:42
@Saeed I think the requirement that a path cannot visit the same vertex more than once simply means that the path cannot contain any cycles. –  Joel Lee Apr 4 '11 at 8:46
@Joel, This is a simple path definition in all graph references (i.e see wiki), but I don't know what's the meaning of unique? finding simple paths in graph, is simple backtracking but if the OP wants anything else I want to know about it. –  Saeed Amiri Apr 4 '11 at 9:18
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Here's the pseudocode I just came up with:

1. Start at any node.
2. Get all of its paths
3. See where they lead, if it's a node that has not been visited then visit it.
4. Call the same function recursively for the nodes from the previous paths.
5. Keep a counter for the number of paths.

This would be this code in Java (untested):

public int getPaths (Node n, Set<Node> nodesVisited) {
int pathCount = 0;
for (Path p : n.getPaths()) {
Node otherSide = p.getOtherNode(n); // Where this function basically takes a node and gets the other node in the path
if (!(nodesVisited.contains(otherSide))) {