The phase transition in random regular exact cover

Abstract

A k-uniform, d-regular instance of Exact Cover is a family of m sets Fn,d,k = \ Sj ⊂eq \1,...,n\ \, where each subset has size k and each 1 i n is contained in d of the Sj. It is satisfiable if there is a subset T ⊂eq \1,...,n\ such that |T Sj|=1 for all j. Alternately, we can consider it a d-regular instance of Positive 1-in-k SAT, i.e., a Boolean formula with m clauses and n variables where each clause contains k variables and demands that exactly one of them is true. We determine the satisfiability threshold for random instances of this type with k > 2. Letting d = k(k-1)(- (1-1/k)) + 1, we show that Fn,d,k is satisfiable with high probability if d < d and unsatisfiable with high probability if d > d. We do this with a simple application of the first and second moment methods, boosting the probability of satisfiability below d to 1-o(1) using the small subgraph conditioning method.