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if l1 is in NP-HARD, so for every L2!=empty set, l1*l2 is in np-hard.

when:

l1*l2={(w1,w2) , w1 in L1 and w2 in L2}

Is it true or false and why?

I can't approve it but I also don't find counter example.

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Vote to move to cstheory.stackexchange.com—this isn't a programming question! –  Yuki Izumi Jun 25 '12 at 2:19
    
Oh, good point. I also think a move might be a good idea. Edit: On second thought, cstheory.stackexchange.com is for research questions... This questions seems a bit too simple... –  Duh Jun 25 '12 at 8:25

1 Answer 1

L1 * L2 is NP-hard.

Proof: Let L be a language in NP, let f be a reduction of L to L1 and let w2 be in L2. Define g(x) = (f(x), w2). Now g is a polynomial time many-to-one reduction of L to L1*L2 because clearly:

x in L <==> (f(x), w(2)) in L1*L2

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