A note on Ordered Ruzsa-SzemerΓ©di graphs

February 04, 2025 Β· Declared Dead Β· πŸ› arXiv.org

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Authors Kevin Pratt arXiv ID 2502.02455 Category cs.DS: Data Structures & Algorithms Cross-listed math.CO Citations 2 Venue arXiv.org Last Checked 4 months ago
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 $(1-\varepsilon)$-approximate maximum matching problem whose runtimes are determined by a purely combinatorial quantity: the maximum density of Ordered Ruzsa-SzemerΓ©di (ORS) graphs. We say a graph $G$ is an $(r,t)$-ORS graph if its edges can be partitioned into $t$ matchings $M_1,M_2, \ldots, M_t$ each of size $r$, such that for every $i$, $M_i$ is an induced matching in the subgraph $M_{i} \cup M_{i+1} \cup \cdots \cup M_t$. This is a relaxation of the extensively-studied notion of a Ruzsa-SzemerΓ©di (RS) graph, the difference being that in an RS graph each $M_i$ must be an induced matching in $G$. In this note, we show that these two notions are roughly equivalent. Specifically, let $\mathrm{ORS}(n)$ be the largest $t$ such that there exists an $n$-vertex ORS-$(Ξ©(n), t)$ graph, and define $\mathrm{RS}(n)$ analogously. We show that if $\mathrm{ORS}(n) \ge Ξ©(n^c)$, then for any fixed $Ξ΄> 0$, $\mathrm{RS}(n) \ge Ξ©(n^{c(1-Ξ΄)})$. This resolves a question of Behnezhad and Ghafari.
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