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    The polynomial-time reducibility relation is transitive. — Carmelics
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    Supports→A polynomial time algorithm for any single NP-complete problem would entail the existence of polynomial time algorithms for all problems in NP.
    Supports→The existence of a polynomial time algorithm for any single NP-complete problem would entail the existence of polynomial time algorithms for all problems in NP.

    The polynomial-time reducibility relation is transitive.

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    A polynomial time algorithm for any single NP-complete problem would entail the ...NP-complete problems are defined such that every problem in NP is polynomial-tim...The existence of a polynomial time algorithm for any single NP-complete problem ...

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    Polynomial-time reducibility ≤_P is transitive88%The polynomial time many-one reducibility relation is a preorder (refl...88%Polynomial-time reducibility (≤_P) is transitive88%The polynomial time many-one reducibility relation ≤_P is a preorder (...87%

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    [21] It also follows from the transitivity of \(\leq_P\) that the existence of a polynomial time algorithm for even one \(\textbf{NP}\)-complete problem would entail the existence of polynomial time algorithms for all problems in \(\textbf{NP}\). The existence of such an algorithm would thus run strongly counter to expectation in virtue of the extensive effort which has been devoted to finding efficient solutions for particular \(\textbf{NP}\)-complete problems such as \(\sc{INTEGER}\ \sc{PROGRA

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