Gap theorems for robust satisfiability: Boolean CSPs and beyond
Abstract
A computational problem exhibits a "gap property" when there is no tractable boundary between two disjoint sets of instances. We establish a Gap Trichotomy Theorem for a family of constraint problem variants, completely classifying the complexity of possible -hard gaps in the case of Boolean domains. As a consequence, we obtain a number of dichotomies for the complexity of specific variants of the constraint satisfaction problem: all are either polynomial-time tractable or -complete. Schaefer's original dichotomy for variants is a notable particular case. Universal algebraic methods have been central to recent efforts in classifying the complexity of constraint satisfaction problems. A second contribution of the article is to develop aspects of the algebraic approach in the context of a number of variants of the constraint satisfaction problem. In particular, this allows us to lift our results on Boolean domains to many templates on non-Boolean domains.
Cite
@article{arxiv.1610.09574,
title = {Gap theorems for robust satisfiability: Boolean CSPs and beyond},
author = {Lucy Ham},
journal= {arXiv preprint arXiv:1610.09574},
year = {2017}
}