Stability results for graphs with a critical edge

TL;DR

This paper improves quantitative stability results for graphs with a critical edge, refining how close such graphs are to Turán graphs when they are nearly extremal and $H$-free.

Contribution

It provides sharper, often optimal, bounds on the distance to Turán graphs for $H$-free graphs with a critical edge, extending classical stability theorems.

Findings

Sharper bounds for stability in graphs with a critical edge

Results are often optimal within a constant factor

Enhanced understanding of proximity to Turán graphs

Abstract

The classical stability theorem of Erd\H{o}s and Simonovits states that, for any fixed graph with chromatic number $k+1 \ge 3$, the following holds: every $n$-vertex graph that is $H$-free and has within $o(n^2)$ of the maximal possible number of edges can be made into the $k$-partite Tur\'{a}n graph by adding and deleting $o(n^2)$ edges. In this paper, we prove sharper quantitative results for graphs $H$ with a critical edge, both for the Erd\H{o}s-Simonovits Theorem (distance to the Tur\'{a}n graph) and for the closely related question of how close an $H$-free graph is to being $k$-partite. In many cases, these results are optimal to within a constant factor.