Symmetric Rule-Based Achlioptas Processes for Random k-SAT
Abstract
Inspired by the "power-of-two-choices" model from random graphs, we investigate the possibility of limited choices of online clause choices that could shift the satisfiability threshold in random k-SAT.Here, we introduce an assignment symmetric, non-adaptive, topology-oblivious online rule called MIDDLE-HEAVY, that prioritizes balanced sign profile clauses.Upon applying a biased 2-SAT projection and a two-type branching process certificate, we derive closed-form expressions for the shifted thresholds αSYM(k,) for this algorithm.We show that minimal choices =5 for k=4, =4 for k=5, and =3 for k 6 suffice to exceed the asymptotic first-moment upper bound 2k 2 for random k-SAT.Moreover, to bridge the gap with biased assignment rules used in maximum of the previous works in this context, we propose a hybrid symmetric biased rule that achieves thresholds comparable to prior work while maintaining symmetry.Our results advance the understanding of Achlioptas processes in random CSPs beyond classical graph-theoretic settings.
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