A complexity dichotomy for poset constraint satisfaction

Abstract

In this paper we determine the complexity of a broad class of problems that extends the temporal constraint satisfaction problems. To be more precise we study the problems Poset-SAT(), where is a given set of quantifier-free ≤-formulas. An instance of Poset-SAT() consists of finitely many variables x1,…,xn and formulas φi(xi1,…,xik) with φi ∈ ; the question is whether this input is satisfied by any partial order on x1,…,xn or not. We show that every such problem is NP-complete or can be solved in polynomial time, depending on . All Poset-SAT problems can be formalized as constraint satisfaction problems on reducts of the random partial order. We use model-theoretic concepts and techniques from universal algebra to study these reducts. In the course of this analysis we establish a dichotomy that we believe is of independent interest in universal algebra and model theory.