English

Off-Diagonal Commonality of Graphs via Entropy

Combinatorics 2023-07-11 v1

Abstract

A graph HH is common if the limit as nn\to\infty of the minimum density of monochromatic labelled copies of HH in an edge colouring of KnK_n with red and blue is attained by a sequence of quasirandom colourings. We apply an information-theoretic approach to show that certain graphs obtained from odd cycles and paths via gluing operations are common. In fact, for every pair (H1,H2)(H_1,H_2) of such graphs, there exists p(0,1)p\in(0,1) such that an appropriate linear combination of red copies of H1H_1 and blue copies of H2H_2 is minimized by a quasirandom colouring in which p(n2)p\binom{n}{2} edges are red; such a pair (H1,H2)(H_1,H_2) is said to be (p,1p)(p,1-p)-common. Our approach exploits a strengthening of the common graph property for odd cycles that was recently proved using Schur convexity. We also exhibit a (p,1p)(p,1-p)-common pair (H1,H2)(H_1,H_2) such that H2H_2 is uncommon.

Keywords

Cite

@article{arxiv.2307.03788,
  title  = {Off-Diagonal Commonality of Graphs via Entropy},
  author = {Natalie Behague and Natasha Morrison and Jonathan A. Noel},
  journal= {arXiv preprint arXiv:2307.03788},
  year   = {2023}
}

Comments

29 pages. Several results and open problems which appear here appeared in early arXiv versions of the paper 'Common Pairs of Graphs' arXiv:2208.02045 which was later split into two papers, of which this is the second

R2 v1 2026-06-28T11:24:50.495Z