English

A note on Ordered Ruzsa-Szemer\'edi graphs

Data Structures and Algorithms 2025-02-05 v1 Combinatorics

Abstract

A recent breakthrough of Behnezhad and Ghafari [FOCS 2024] and subsequent work of Assadi, Khanna, and Kiss [SODA 2025] gave algorithms for the fully dynamic (1ε)(1-\varepsilon)-approximate maximum matching problem whose runtimes are determined by a purely combinatorial quantity: the maximum density of Ordered Ruzsa-Szemer\'edi (ORS) graphs. We say a graph GG is an (r,t)(r,t)-ORS graph if its edges can be partitioned into tt matchings M1,M2,,MtM_1,M_2, \ldots, M_t each of size rr, such that for every ii, MiM_i is an induced matching in the subgraph MiMi+1MtM_{i} \cup M_{i+1} \cup \cdots \cup M_t. This is a relaxation of the extensively-studied notion of a Ruzsa-Szemer\'edi (RS) graph, the difference being that in an RS graph each MiM_i must be an induced matching in GG. In this note, we show that these two notions are roughly equivalent. Specifically, let ORS(n)\mathrm{ORS}(n) be the largest tt such that there exists an nn-vertex ORS-(Ω(n),t)(\Omega(n), t) graph, and define RS(n)\mathrm{RS}(n) analogously. We show that if ORS(n)Ω(nc)\mathrm{ORS}(n) \ge \Omega(n^c), then for any fixed δ>0\delta > 0, RS(n)Ω(nc(1δ))\mathrm{RS}(n) \ge \Omega(n^{c(1-\delta)}). This resolves a question of Behnezhad and Ghafari.

Keywords

Cite

@article{arxiv.2502.02455,
  title  = {A note on Ordered Ruzsa-Szemer\'edi graphs},
  author = {Kevin Pratt},
  journal= {arXiv preprint arXiv:2502.02455},
  year   = {2025}
}
R2 v1 2026-06-28T21:32:20.616Z