Hard Clique Formulas for Resolution

Abstract

We show how to convert any unsatisfiable 3-CNF formula which is sparse and exponentially hard to refute in Resolution into a negative instance of the k-clique problem whose corresponding natural encoding as a CNF formula is n(k)-hard to refute in Resolution. This applies to any function k = k(n) of the number n of vertices, provided k0 ≤ k ≤ n1/c0, where k0 and c0 are small constants. We establish this by demonstrating that Resolution can simulate the correctness proof of a particular kind of reduction from 3-SAT to the parameterized clique problem. This also re-establishes the known conditional hardness result for k-clique which states that if the Exponential Time Hypothesis (ETH) holds, then the k-clique problem cannot be solved in time no(k). Since it is known that the analogue of ETH holds for Resolution, unconditionally and with explicit hard instances, this gives a way to obtain explicit instances of k-clique that are unconditionally n(k)-hard to refute in Resolution. This solves an open problem that appeared published in the literature at least twice.