# NP-Hard solution question

i have NP hard problem. Let imagine I have found some polynomial algorithm that find ONLY one of many existing solutions of that problem, but at least one solution (if present in the probem). Is that algorithm considered as solution of NP=P question (if that algorithm transformed to mathematical proof)?

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NP is a class of decision problems. Your algorithm should answer "yes" or "no" correctly to all possible instances (questions).

For example, the problem: "given graph G and number k, does G contain a clique of size >= k" is NP-hard. If you have a polynomial time algorithm that answers "yes" or "no" correctly each time, then it is a valid proof of P=NP. The algorithm doesn't need to explicitly show the clique - only answer if it exists for all possible G and k.

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thank you, this is what I need to know –  joseph Oct 12 '10 at 16:01
"The algorithm doesn't need to explicitly show the clique" - a side note to that: if such a polynomial decision algorithm exists then it's also easy to find the actual clique. –  Rafał Dowgird Oct 12 '10 at 19:58
This sounds wrong to me. I don't see how the traveling salesman problem, for example, can be expressed as a yes/no question. –  Jason Orendorff Oct 13 '10 at 12:17
Given weighted graph G and number k, is there a path of cost <= k? Easily reducible from hamiltonian cycle. –  sdcvvc Oct 13 '10 at 13:08