An algebraic approach to Borel CSPs

Abstract

We adapt tools from the algebraic approach to constraint satisfaction problems to answer descriptive set theoretic questions about Borel CSPs. We show that if a structure D does not have a Taylor polymorphism, then the corresponding Borel CSP is 12-complete. In particular, by the CSP Dichotomy Theorem, if CSP( D) is NP-complete, then the Borel version, cspB( D), is 12-complete (assuming P=NP). We also have partial converses, such as a descriptive analogue of the Hell--Ne set ril theorem characterizing 12-complete graph homomorphism problems. We show that the structures where every solvable Borel instance of their CSP has a Borel solution are exactly the width 1 structures. And, we prove a handful of results bounding the projective complexity of certain bounded width structures.