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May be I am not understanding this right but I am looking for a diagram that shows how NP-Easy and NP problem sets are related. Are all NP-Easy problems in NP?

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closed as off topic by Bob Kaufman, casperOne Dec 8 '11 at 4:10

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Thanks Jon. But I was looking for something that shows NP-Easy's relationship to NP. – user1069683 Dec 7 '11 at 23:13
    
You are looking for answer in the wrong place. This is StackOverflow, to get more answers, go to StackExchange's site focused on Mathematics, having similar questions like this one. – Tadeck Dec 8 '11 at 4:10

Well yes they are in a colloquial sense. NP-Easy problems are function problems, i.e. the goal is compute an output based on an input, where as NP problems are decisions problems, i.e. the goal is to compute a boolean result (yes or no) based on an input. NP-Easy is just the equivalent of NP for function problems instead of decision problems.

In other words, NP-Easy and NP problems are computationally as hard, but they are two different, not comparable classes of problems because NP problems are decision problems and NP-Easy problems are function problems.

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In NP only the checking part needs to be polynomial time: NP Complete problems hence np-easy is in np.

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