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There are two statements: If a decision problem A is polynomial-time reducible to a decision problem B (i.e., A≤ pB ), and B is NP-complete, then A must be NP-complete.

And:

If a decision problem B is polynomial-time reducible to a decision problem A (i.e., B≤ pA ), and B is NP-complete, then A must be NP-complete.

Which of the above statements are true?

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the first statement is false because it means that by solving B and then applying some polynomial time algorithm you can solve A but maybe there is another way to solve A that doesn't require solving B and maybe it's only polynomial.

the second statement is true because it means that you can solve B by first solving A then apply some polynomial time algorithm to solve B but B is NP-complete so A has to be NP-complete

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  • In second case, A can be in NP-Hard also right? Then the statement becomes false.
    – Jay Patel
    Dec 4, 2015 at 3:21
  • @JayPatel in the first statement A maybe NP-hard or maybe not which make the statement False because the first statment says "must be NP-hard" which is not the case but in the second statement A is NP-hard always so it's True
    – m7mdbadawy
    Dec 4, 2015 at 3:39
  • The second statement is false, because you don't know if A belongs to NP. If so, then A it's NP-complete, otherwise you can't say it!
    – FonzTech
    Aug 21, 2019 at 22:08
  • Second statement false. It should be Np Hard
    – kutlu
    May 19, 2022 at 2:19

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