Relaxation and Metastability in the RandomWalkSAT search procedure
Abstract
An analysis of the average properties of a local search resolution procedure for the satisfaction of random Boolean constraints is presented. Depending on the ratio alpha of constraints per variable, resolution takes a time Tres growing linearly (Tres tau(alpha) N, alpha < alphad) or exponentially (Tres exp(N zeta(alpha)), alpha > alphad) with the size N of the instance. The relaxation time tau(alpha) in the linear phase is calculated through a systematic expansion scheme based on a quantum formulation of the evolution operator. For alpha > alphad, the system is trapped in some metastable state, and resolution occurs from escape from this state through crossing of a large barrier. An annealed calculation of the height zeta(alpha) of this barrier is proposed. The polynomial/exponentiel cross-over alphad is not related to the onset of clustering among solutions.
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