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A <poly B

Problem A is reduced to problem B.Problem A can be solved in nlogn time. Problem B is Known NP complete problem.

  • Can I say problem B be solved in polynomial time?
  • If problem B can be solved polynomial time then can we solve any problem A?(generally if A is NP complete problem)
  • If B can be solved in polynomial time, does it imply that A can be solved in polynomial time and vice versa ( reverse reduction).
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If I understand you correctly:

  • you have a "simple" problem A (it can be solved in n logn time).
  • Problem A can be rewritten as problem B, which is known to be NP-hard. (In that case the notion "reduction" is misleading, because acually things are made more complicated by this rewriting.)

In order to solve problem B via problem A one must rewrite problem B as problem A. But rewriting a problem is in general not reversible. Of course, a rewriting may be invertible. But in your case this is highly improbable because this would mean that problem B is not NP-hard any more.

Now to your questions:

  • No: B is not solved by a rewriting problem A as B.
  • Sure: if you can reduce a problem to a "simple" problem than the original problem is also "simple".
  • No: you need an explicit rewriting/reduction of problem B to problem A.

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