Toward a Uniform Algorithm and Uniform Reduction for Constraint Problems
Abstract
We develop a unified framework to characterize the power of higher-level algorithms for the constraint satisfaction problem (CSP), such as -consistency, the Sherali-Adams LP hierarchy, and the affine IP hierarchy. As a result, solvability of a fixed-template CSP or, more generally, a Promise CSP by a given level is shown to depend only on the polymorphism minion of the template. Similarly, we obtain a minion-theoretic description of -consistency reductions between Promise CSPs. We introduce a new hierarchy of SDP-like vector relaxations with vectors over in which orthogonality is imposed on -tuples of vectors. Surprisingly, this relaxation turns out to be equivalent to the -th level of the AIP- relaxation. We show that it solves the CSP of the dihedral group , the smallest CSP that fools the singleton BLP+AIP algorithm. Using this vector representation, we further show that the -th level of the relaxation solves linear equations modulo .
Cite
@article{arxiv.2604.06335,
title = {Toward a Uniform Algorithm and Uniform Reduction for Constraint Problems},
author = {Libor Barto and Maximilian Hadek and Dmitriy Zhuk},
journal= {arXiv preprint arXiv:2604.06335},
year = {2026}
}