English

Seurat games on Stockmeyer graphs

Combinatorics 2021-12-09 v4

Abstract

We define a family of vertex colouring games played over a pair of graphs or digraphs (G,H)(G,H) by players \forall and \exists. These games arise from work on a longstanding open problem in algebraic logic. It is conjectured that there is a natural number nn such that \forall always has a winning strategy in the game with nn colours whenever G≇HG\not\cong H. This is related to the reconstruction conjecture for graphs and the degree-associated reconstruction conjecture for digraphs. We show that the reconstruction conjecture implies our game conjecture with n=3n=3 for graphs, and the same is true for the degree-associated reconstruction conjecture and our conjecture for digraphs. We show (for any k<ωk<\omega) that the 2-colour game can distinguish certain non-isomorphic pairs of graphs that cannot be distinguished by the kk-dimensional Weisfeiler-Leman algorithm. We also show that the 2-colour game can distinguish the non-isomorphic pairs of graphs in the families defined by Stockmeyer as counterexamples to the original digraph reconstruction conjecture.

Keywords

Cite

@article{arxiv.2008.01327,
  title  = {Seurat games on Stockmeyer graphs},
  author = {Rob Egrot and Robin Hirsch},
  journal= {arXiv preprint arXiv:2008.01327},
  year   = {2021}
}

Comments

v3 makes significant additions

R2 v1 2026-06-23T17:37:23.100Z