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I am looking the number of unique x length paths through a graph starting at a particular node.

However I have a restriction that no node is visited more than once on any path.

For example take the following graph:
enter image description here

If I am after the number of 3 length paths starting at 5.

The answer would be 9.

5 -> 2 -> 1 -> 3
5 -> 2 -> 4 -> 3
5 -> 2 -> 4 -> 7
5 -> 4 -> 2 -> 1
5 -> 4 -> 3 -> 1
5 -> 4 -> 7 -> 6
5 -> 6 -> 7 -> 4
5 -> 7 -> 4 -> 2
5 -> 7 -> 4 -> 3

Note I am only concerted with the answer (9) not the specific paths.

I have tried using an adjacency matrix to the power of x to give the number of paths, but I cannot work out how to account for unique node restriction.

I have also tried using a depth-first search but the amount of nodes and size of x makes this infeasible.

EDIT: Confused DFS with BFS (Thank you Nylon Smile & Nikita Rybak).

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How about depth-limited search? it gives you a better space complexity –  Nylon Smile Feb 8 '11 at 2:53
BFS is a pretty basic graph-searching algorithm - seems like it would take a ginormous graph to make it infeasible... How big is a normal graph (both edges and vertices)? Also, how is it stored? –  Xavier Holt Feb 8 '11 at 2:56
@threenplusone I think you mean DFS, BFS has little use here. –  Nikita Rybak Feb 8 '11 at 2:59
@Xavier Holt: In my main problem there are approx 1000 nodes, approx 30000 edges and I am after a length of 256. It is stored as an adjacency list & matrix. –  threenplusone Feb 8 '11 at 3:03
@Nikita Rybak & Nylon Smile: My apologies I did mean depth-first search (limited) not breadth. –  threenplusone Feb 8 '11 at 3:07

2 Answers 2

up vote 9 down vote accepted

This is NP-Hard.

Reduction from Hamiltonian Path.

Given a graph whose Hamiltonian Path existence we need to check...

Run your algorithm for each vertex, with a path length n-1. Any non-zero return corresponds to Hamiltonian path and vice versa.

So basically, if you find a polynomial time algorithm to solve your problem, then you have a polynomial time algorithm to solve the Hamiltonian Path problem, effectively proving P=NP!

Note: This assumes x is an input.

If you x was fixed (i.e. independent of the number of vertices in the graph), then you have O(n^x) time algorithms, which is in P, but still pretty impractical for medium sized x.

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+1 beat me to it –  Nikita Rybak Feb 8 '11 at 2:57
Reduction from HP doesn't mean NP-Hard it means NP-complete. –  Saeed Amiri Feb 8 '11 at 5:52
@Saeed: NP-Complete = NP-Hard AND NP. Reduction from HP means NP-Hard. If you want NP-Complete, you also have to prove membership in NP. –  Aryabhatta Feb 8 '11 at 5:57
@Moron, NP is just for decision problems, see wiki's picture: en.wikipedia.org/wiki/NP-hard, but NP-Hard is for decision problems, search problems, or optimization problems. –  Saeed Amiri Feb 8 '11 at 5:59
@Saeed: Reduction from an NP-Complete problem means NP-Hard. Period. If you manage to show that the problem is also in NP, only then it is NP-Complete. Frankly I don't understand what you are trying to say. –  Aryabhatta Feb 8 '11 at 6:08

This problem is a counting problem in #P (number of solutions) instead of a decision problem in NP (yes or no).

Moron's reduction still works to prove the problem is #P-Complete because Hamilton Paths is also #P-complete.

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I don't know if this extra answer is appropriate - I just felt so many of the comments of the other answer were about NP-nitpicking and I didn't want the #P bit to get buried under there. –  hugomg Feb 9 '11 at 15:08
+1: I agree it is worth another answer, given the traffic to the other one. –  Aryabhatta Feb 9 '11 at 17:32

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