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I'm looking for an approximation algorithm for the following problem - I have an unweighted, undirected graph, with cycles, and want to find the longest path starting from a given node. I do value speed over performance (so a O(n^5) algorithm would probably be an overkill).

This is not homework (I swear!) or work related, but I will appreciate any tip you might have.

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is this for the google contest? Thats how I got here, haha! – aramadia Feb 11 '10 at 21:02
You know me too well :) – r0u1i Feb 17 '10 at 9:47
up vote 7 down vote accepted

I'm looking for an approximation algorithm for the following problem ...

Scientists are looking for it as well. They have also proved that polynomial constant-factor approximation doesn't exist if P ≠ NP. And the abstract of this article claims that it contains an approximation algorithm for your problem.

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Wow, I didn't know that. I thought the generalized problem has a constant factor approximation algorithm. What about restricting the problem even further, by having a maximum number of neighbors which is constant? – r0u1i Feb 8 '10 at 11:09
@r0u1i, Whoops, the first article I linked also contains a proof that such restriction doesn't help :-). – Pavel Shved Feb 8 '10 at 12:09
Thanks, You win :) – r0u1i Feb 8 '10 at 12:29
Note though that NP-completeness result does not necessarily tell anything about the graph instances you work with. For example, SAT is NP-complete but huge SAT instances are solved routinely in industrial applications. Also, are your graphs planar? Can you restrict your (apparent) condition that you can visit a node only once? Does the process by which your graph is constructed give a hint to the nature of the longest paths? – Antti Huima Feb 9 '10 at 1:01
It is planar, what can I do with that? – r0u1i Feb 17 '10 at 9:46

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