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Determining if a word of specific length exists that is not accepted by a NFA

Your problem is NP-complete, by reduction from 3SAT. Let $\varphi$ be a 3SAT formula with $m$ clauses and on the $n$ variables $x_1,\dots,x_n$. Construct a NFA over the alphabet $\Sigma=\{0,1\}$ as follows. The $n$-bit input to the NFA is treated as an assignment to $x_1,\dots,x_n$. The NFA first nondeterministically selects one of the $m$ clauses. Then,...

answered 9 hours ago

D.W.

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The decision procedure of theory of closed real field is in NP-hard?

Yes, even in the purely existential case. See https://en.wikipedia.org/wiki/Existential_theory_of_the_reals

cc.complexity-theory np-hardness complexity-classes computational-geometry

answered Dec 21 '19 at 7:32

David Eppstein

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Tag Info

New answers tagged np-hardness

Determining if a word of specific length exists that is not accepted by a NFA

The decision procedure of theory of closed real field is in NP-hard?

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New answers tagged np-hardness

Determining if a word of specific length exists that is not accepted by a NFA

The decision procedure of theory of closed real field is in NP-hard?

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