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    The existence of a polynomial time algorithm for any NP-c... — Carmelics
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    Home/Modality & Possibility
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    Supports→NP-complete problems are widely believed to lack polynomial time algorithms

    The existence of a polynomial time algorithm for any NP-complete problem would imply P = NP, which runs strongly counter to expectation

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    Related propositions within the same area of thought.
    Extensive effort has been devoted to finding efficient solutions for NP-complete...NP-complete problems are widely believed to lack polynomial time algorithms

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    The existence of a polynomial time algorithm for any NP-complete probl...98%The existence of a polynomial time algorithm for any NP-complete probl...97%It is unlikely that a polynomial time algorithm exists for any NP-comp...93%The existence of a polynomial time algorithm for any single NP-complet...91%

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    The graph \(G_{\phi}\) for the formula \((p_1 \vee p_2 \vee p_3) \wedge (\neg p_1 \vee p_2 \vee \neg p_3) \wedge (p_1 \vee \neg p_2 \vee \neg p_3)\). A reduction of \(3\text{-}\sc{SAT}\) to \(\sc{INDEPENDENT}\ \sc{SET}\) can now be described as follows: Let \(\phi\) be a \(3\text{-}\sc{CNF}\) formula consisting of \(n\) clauses as depicted above. We construct a graph \(G_{\phi} = \langle V,E \rangle\) consisting of \(n\)-triangles \(T_1,\ldots,T_n\) such that the nodes of \(T_i\) are respect

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