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    This strongly suggests no such polynomial time algorithm ... — Carmelics
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    Supports→NP-complete problems are the most difficult problems in NP (assuming P ≠ NP)

    This strongly suggests no such polynomial time algorithm exists

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    Related propositions within the same area of thought.
    A polynomial time algorithm for any one NP-complete problem would entail polynom...Extensive effort has been devoted to finding efficient solutions for NP-complete...NP-complete problems are the most difficult problems in NP (assuming P ≠ NP)

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    In many cases where no polynomial time algorithm is known, there is al...91%It is unlikely that a polynomial time algorithm exists for any NP-comp...90%The existence of a polynomial time algorithm for any NP-complete probl...86%No polynomial time algorithm has been found for any NP-complete proble...86%

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    \(\sc{INDEPENDENT}\ \sc{SET}\ \) Given a graph \(G = \langle V,E \rangle\) and a natural number \(k \leq \lvert V\rvert\), does there exist a set of vertices \(V' \subseteq V\) of cardinality \(\geq k\) such that no two vertices in \(V'\) are connected by an edge? \(\sc{VERTEX}\ \sc{COVER}\ \) Given a graph \(G = \langle V,E \rangle\) and a natural number \(k \leq \lvert V\rvert\), does there exist a set of vertices \(V' \subseteq V\) of cardinality \(\leq k\) such that for each edge \(\langle u

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