English

FO Model Checking on Posets of Bounded Width

Logic in Computer Science 2015-06-01 v2 Discrete Mathematics

Abstract

Over the past two decades the main focus of research into first-order (FO) model checking algorithms have been sparse relational structures-culminating in the FPT-algorithm by Grohe, Kreutzer and Siebertz for FO model checking of nowhere dense classes of graphs [STOC'14], with dense structures starting to attract attention only recently. Bova, Ganian and Szeider [LICS'14] initiated the study of the complexity of FO model checking on partially ordered sets (posets). Bova, Ganian and Szeider showed that model checking existential FO logic is fixed-parameter tractable (FPT) on posets of bounded width, where the width of a poset is the size of the largest antichain in the poset. The existence of an FPT algorithm for general FO model checking on posets of bounded width, however, remained open. We resolve this question in the positive by giving an algorithm that takes as its input an nn-element poset P\cal P of width ww and an FO logic formula ϕ\phi, and determines whether ϕ\phi holds on P\cal P in time f(ϕ,w)n2f(\phi,w)\cdot n^2.

Keywords

Cite

@article{arxiv.1504.04115,
  title  = {FO Model Checking on Posets of Bounded Width},
  author = {Jakub Gajarský and Petr Hliněný and Daniel Lokshtanov and Jan Obdržálek and Sebastian Ordyniak and M. S. Ramanujan and Saket Saurabh},
  journal= {arXiv preprint arXiv:1504.04115},
  year   = {2015}
}

Comments

Minor correction, p.5, def. of \tau_{s+1}: instead of an induced subdigraph of D_s, we use the appropriate relational structure formed from this subdigrph

R2 v1 2026-06-22T09:16:59.557Z