The Asymptotic Order of the k-SAT Threshold
Abstract
Form a random k-SAT formula on n variables by selecting uniformly and independently m=rn clauses out of all 2k (n choose k) possible k-clauses. The Satisfiability Threshold Conjecture asserts that for each k there exists a constant rk such that, as n tends to infinity, the probability that the formula is satisfiable tends to 1 if r < rk and to 0 if r > rk. It has long been known that 2k / k < rk < 2k. We prove that rk > 2k-1 2 - dk, where dk (1+ 2)/2. Our proof also allows a blurry glimpse of the ``geometry'' of the set of satisfying truth assignments, and a nearly exact location of the threshold for Not-All-Equal (NAE) k-SAT.
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