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Topology and adjunction in promise constraint satisfaction

Andrei Krokhin, Jakub Opršal, Marcin Wrochna, Stanislav Živný

2023Durham Research Online (Durham University)21 citationsDOIOpen Access PDF

Abstract

The approximate graph colouring problem, whose complexity is unresolved in most cases, concerns finding a c-colouring of a graph that is promised to be k-colourable, where c≥k. This problem naturally generalises to promise graph homomorphism problems and further to promise constraint satisfaction problems. The complexity of these problems has recently been studied through an algebraic approach. In this paper, we introduce two new techniques to analyse the complexity of promise CSPs: one is based on topology and the other on adjunction. We apply these techniques, together with the previously introduced algebraic approach, to obtain new unconditional NP-hardness results for a significant class of approximate graph colouring and promise graph homomorphism problems.

Topics & Concepts

AdjunctionConstraint (computer-aided design)Topology (electrical circuits)MathematicsConstraint satisfaction problemComputer sciencePure mathematicsCombinatoricsArtificial intelligenceGeometryProbabilistic logicAdvanced Graph Theory ResearchComplexity and Algorithms in GraphsConstraint Satisfaction and Optimization
Topology and adjunction in promise constraint satisfaction | Litcius