Off-Diagonal Commonality of Graphs via Entropy
Abstract
A graph is common if the limit as of the minimum density of monochromatic labelled copies of in an edge colouring of 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 of such graphs, there exists such that an appropriate linear combination of red copies of and blue copies of is minimized by a quasirandom colouring in which edges are red; such a pair is said to be -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 -common pair such that is uncommon.
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