Scheme-Theoretic Approach to Computational Complexity. IV. A New Perspective on Hardness of Approximation

Abstract

We provide a new approach for establishing hardness of approximation results, based on the theory recently introduced by the author. It allows one to directly show that approximating a problem beyond a certain threshold requires super-polynomial time. To exhibit the framework, we revisit two famous problems in this paper. The particular results we prove are: MAX-3-SAT(1,78+ε) requires exponential time for any constant ε satisfying 18 ≥ ε > 0. In particular, the gap exponential time hypothesis (Gap-ETH) holds. MAX-3-LIN-2(1-ε, 12+ε) requires exponential time for any constant ε satisfying 14 ≥ ε > 0.