Geometric properties of satisfying assignments of random ε-1-in-k SAT

Abstract

We study the geometric structure of the set of solutions of random ε-1-in-k SAT problem. For l≥ 1, two satisfying assignments A and B are l-connected if there exists a sequence of satisfying assignments connecting them by changing at most l bits at a time. We first prove that w.h.p. two assignments of a random ε-1-in-k SAT instance are O( n)-connected, conditional on being satisfying assignments. Also, there exists ε0∈ (0,1k-2) such that w.h.p. no two satisfying assignments at distance at least ε0· n form a "hole" in the set of assignments. We believe that this is true for all ε >0, and thus satisfying assignments of a random 1-in-k SAT instance form a single cluster.