English

Polynomial definability in constraint languages with few subpowers

Logic in Computer Science 2026-01-28 v3 Logic Rings and Algebras

Abstract

A first-order formula is called primitive positive (pp) if it only admits the use of existential quantifiers and conjunction. Pp-formulas are a central concept in (fixed-template) constraint satisfaction since CSP(Γ\Gamma) can be viewed as the problem of deciding the primitive positive theory of Γ\Gamma, and pp-definability captures gadget reductions between CSPs. An important class of tractable constraint languages Γ\Gamma is characterized by having few subpowers, that is, the number of nn-ary relations pp-definable from Γ\Gamma is bounded by 2p(n)2^{p(n)} for some polynomial p(n)p(n). In this paper we study a restriction of this property, stating that every pp-definable relation is definable by a pp-formula of polynomial length. We conjecture that the existence of such short definitions is actually equivalent to Γ\Gamma having few subpowers, and verify this conjecture for a large subclass that, in particular, includes all constraint languages on three-element domains. We furthermore discuss how our conjecture imposes an upper complexity bound of co-NP on the subpower membership problem of algebras with few subpowers.

Keywords

Cite

@article{arxiv.2305.01984,
  title  = {Polynomial definability in constraint languages with few subpowers},
  author = {Jakub Bulín and Michael Kompatscher},
  journal= {arXiv preprint arXiv:2305.01984},
  year   = {2026}
}

Comments

22 pages; a preliminary version was published in proceedings of MFCS 2023 under the title "Short definitions in constraint languages"

R2 v1 2026-06-28T10:24:21.037Z