English

Hereditary quasirandomness without regularity

Combinatorics 2016-12-23 v2

Abstract

A result of Simonovits and S\'os states that for any fixed graph HH and any ϵ>0\epsilon > 0 there exists δ>0\delta > 0 such that if GG is an nn-vertex graph with the property that every SV(G)S \subseteq V(G) contains pe(H)Sv(H)±δnv(H)p^{e(H)} |S|^{v(H)} \pm \delta n^{v(H)} labeled copies of HH, then GG is quasirandom in the sense that every SV(G)S \subseteq V(G) contains 12pS2±ϵn2\frac{1}{2} p |S|^2 \pm \epsilon n^2 edges. The original proof of this result makes heavy use of the regularity lemma, resulting in a bound on δ1\delta^{-1} which is a tower of twos of height polynomial in ϵ1\epsilon^{-1}. We give an alternative proof of this theorem which avoids the regularity lemma and shows that δ\delta may be taken to be linear in ϵ\epsilon when HH is a clique and polynomial in ϵ\epsilon for general HH. This answers a problem raised by Simonovits and S\'os.

Keywords

Cite

@article{arxiv.1611.02099,
  title  = {Hereditary quasirandomness without regularity},
  author = {David Conlon and Jacob Fox and Benny Sudakov},
  journal= {arXiv preprint arXiv:1611.02099},
  year   = {2016}
}

Comments

15 pages

R2 v1 2026-06-22T16:44:19.836Z