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If a problem X (decision problem) is known to be NP-Complete, and proven to be reduced to problem Y in polynomialtime, can you then say problem Y is NP-Complete?

My first thought was, no, problem Y needs to be shown that it is in NP. But after further thought, if X is reduced to Y, Y is already considered to be NP-Complete. Now I'm just confused...any help would be appreciated.

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I think you had it the first time. If we can reduce any known problem to another NP complete problem, than that problem is also NP. –  Jim Nov 2 '10 at 2:46
    
from wiki: "...thousands of other problems have been shown to be NP-complete by reductions from other problems previously shown to be NP-complete;..." so i would say 'yes' is the answer? –  White Dragon Nov 2 '10 at 2:52
    
By definition, Y is "NP-hard". An NP-hard problem is one that can be used to solve any problem in NP, including NP-complete problem. However, an NP-hard problem is not necessarily in NP. –  gnasher729 Mar 31 at 22:02
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4 Answers

Yes that is correct. You can reduce your problem in polynomial time to any already known NP complete problem but that is considered to be a very difficult task. So instead you pick an already NP complete problem and reduce it to your problem and also show that it is in NP, then your problem will be NP complete.

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SAT can be solved in a single call to ALL, but that doesn't mean that ALL is in NP.

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Problem X - Unsure
Problem Y - In NP

To prove X is in NP, you show that you can follow steps to reduce every problem in X to a problem in Y. Then you know that the X problem is at least as hard as the equivalent Y problem.

So no, you need to start with Y and then reduce to X.

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Argumentum per contrarium:

If X ∈ NP and X ⇔ Y and Y ∉ NP then X ∉ NP.

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