# Exact Traveling Salesman Problem (TSP) solution in polynomial time?

Is there an algorithm to solve the (time-indepenedent) TSP problem exactly (no heuristics, nodes are not points in space and costs are arbitrary) in polynomial time?

Thanks!

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Instead of asking, you could have read the first sentence of the Wikipedia article. –  Tim Mar 25 '11 at 14:23
This probably should be moved to cstheory.stackexchange.com –  Ither Mar 25 '11 at 14:23
@Lther: Nope. Off topic on cstheory. –  Aryabhatta Mar 25 '11 at 16:06
Genetic algorithms are pretty good at finding a good solution to TSP almost instantly if you can handle the solution only being "near perfect". In real life situations this is usually a great tradeoff: lalena.com/ai/tsp –  Matthew Lock Nov 23 '14 at 10:31

## 4 Answers

No. It is considered NP-Hard.

If you do find one, tell me (in secret of course) and we'll be rich together :-)

I know Wikipedia can be often wrong, but you might find their page on TSP interesting:

http://en.wikipedia.org/wiki/Travelling_salesman_problem

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Probably not. It is NP-hard.

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If NP=P then the answer is yes, it can be done in polynomial time. If NP≠P, then the answer is no, it cannot be done in polynomial time. NP=P vs. NP≠P is an open problem, though I suspect you'll find that a representative sample of those sufficiently familiar with the issue will have more people who believe NP≠P than who believe NP=P.

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No!, to polynomial time.
Yes!, to there is an exact algorithm.

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