A Characterization of Approximation Resistance

Abstract

A predicate f:-1,1k -> 0,1 with (f) = |f-1(1)|2k is called approximation resistant if given a near-satisfiable instance of CSP(f), it is computationally hard to find an assignment that satisfies at least (f)+(1) fraction of the constraints. We present a complete characterization of approximation resistant predicates under the Unique Games Conjecture. We also present characterizations in the mixed linear and semi-definite programming hierarchy and the Sherali-Adams linear programming hierarchy. In the former case, the characterization coincides with the one based on UGC. Each of the two characterizations is in terms of existence of a probability measure with certain symmetry properties on a natural convex polytope associated with the predicate.