Biased random satisfiability problems: From easy to hard instances
Abstract
In this paper we study biased random K-SAT problems in which each logical variable is negated with probability p. This generalization provides us a crossover from easy to hard problems and would help us in a better understanding of the typical complexity of random K-SAT problems. The exact solution of 1-SAT case is given. The critical point of K-SAT problems and results of replica method are derived in the replica symmetry framework. It is found that in this approximation αc p-(K-1) for p 0. Solving numerically the survey propagation equations for K=3 we find that for p<p* 0.17 there is no replica symmetry breaking and still the SAT-UNSAT transition is discontinuous.
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