English

GMSNP and Finite Structures

Discrete Mathematics 2024-06-21 v1 Combinatorics Logic

Abstract

Given an (infinite) relational structure S\mathbb S, we say that a finite structure C\mathbb C is a minimal finite factor of S\mathbb S if for every finite structure A\mathbb A there is a homomorphism SA\mathbb S\to \mathbb A if and only if there is a homomorphism CA\mathbb{C} \to \mathbb{A}. In this brief note we prove that if CSP(S\mathbb S) is in GMSNP, then S\mathbb S has a minimal finite factor C\mathbb C, and moreover, CSP(C\mathbb C) reduces in polynomial time to CSP(S\mathbb S). We discuss two nice applications of this result. First, we see that if a finite promise constraint satisfaction problem PCSP(A,B\mathbb A,\mathbb B) has a tractable GMSNP sandwich, then it has a tractable finite sandwich. We also show that if G\mathbb G is a non-bipartite (possibly infinite) graph with finite chromatic number, and CSP(G\mathbb G) is in GMSNP, then CSP(G\mathbb G) in NP-complete, partially answering a question recently asked by Bodirsky and Guzm\'an-Pro.

Cite

@article{arxiv.2406.13529,
  title  = {GMSNP and Finite Structures},
  author = {Santiago Guzmán-Pro},
  journal= {arXiv preprint arXiv:2406.13529},
  year   = {2024}
}
R2 v1 2026-06-28T17:12:10.846Z