English

An Extremal Problem Motivated by Triangle-Free Strongly Regular Graphs

Combinatorics 2020-06-04 v1

Abstract

We introduce the following combinatorial problem. Let GG be a triangle-free regular graph with edge density ρ\rho. What is the minimum value a(ρ)a(\rho) for which there always exist two non-adjacent vertices such that the density of their common neighborhood is a(ρ)\leq a(\rho)? We prove a variety of upper bounds on the function a(ρ)a(\rho) that are tight for the values ρ=2/5, 5/16, 3/10, 11/50\rho=2/5,\ 5/16,\ 3/10,\ 11/50, with C5C_5, Clebsch, Petersen and Higman-Sims being respective extremal configurations. Our proofs are entirely combinatorial and are largely based on counting densities in the style of flag algebras. For small values of ρ\rho, our bound attaches a combinatorial meaning to Krein conditions that might be interesting in its own right. We also prove that for any ϵ>0\epsilon>0 there are only finitely many values of ρ\rho with a(ρ)ϵa(\rho)\geq\epsilon but this finiteness result is somewhat purely existential (the bound is double exponential in 1/ϵ1/\epsilon).

Keywords

Cite

@article{arxiv.2006.01937,
  title  = {An Extremal Problem Motivated by Triangle-Free Strongly Regular Graphs},
  author = {Alexander Razborov},
  journal= {arXiv preprint arXiv:2006.01937},
  year   = {2020}
}

Comments

34 pages, 3 figures

R2 v1 2026-06-23T16:00:37.061Z