Online size Ramsey numbers: Path vs C4

Pub Date : 2024-08-20 DOI:10.1016/j.disc.2024.114214

Grzegorz Adamski, Małgorzata Bednarska-Bzdȩga

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Abstract

Given two graphs G and H, a size Ramsey game is played on the edge set of $K_{N}$ . In every round, Builder selects an edge and Painter colours it red or blue. Builder's goal is to force Painter to create a red copy of G or a blue copy of H as soon as possible. The online (size) Ramsey number $\tilde{r} (G, H)$ is the number of rounds in the game provided Builder and Painter play optimally. We prove that $\tilde{r} (C_{4}, P_{n}) \leq 2 n - 2$ for every $n \geq 8$ . The upper bound matches the lower bound obtained by J. Cyman, T. Dzido, J. Lapinskas, and A. Lo, so we get $\tilde{r} (C_{4}, P_{n}) = 2 n - 2$ for $n \geq 8$ . Our proof for $n \leq 13$ is computer-assisted. The bound $\tilde{r} (C_{4}, P_{n}) \leq 2 n - 2$ solves also the “all cycles vs. $P_{n}$ ” game for $n \geq 8$ – it implies that it takes Builder $2 n - 2$ rounds to force Painter to create a blue path on n vertices or any red cycle.

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在线尺寸拉姆齐数字：路径与 C4

给定两个图 G 和 H，在 KN 的边集上进行大小拉姆齐游戏。在每一轮中，"生成者 "选择一条边，"绘制者 "将其染成红色或蓝色。生成者的目标是迫使绘制者尽快创建 G 的红色副本或 H 的蓝色副本。在线拉姆齐数（大小）r˜(G,H) 是生成者和绘制者以最佳方式进行博弈的回合数。我们证明，在每 n≥8 时，r˜(C4,Pn)≤2n-2。这个上界与 J. Cyman、T. Dzido、J. Lapinskas 和 A. Lo 所得到的下界相吻合，因此我们得到 n≥8 时 r˜（C4,Pn）=2n-2。对于 n≤13 的证明由计算机辅助。当 n≥8 时，r˜(C4,Pn)≤2n-2 也能解决 "所有循环与 Pn "博弈--这意味着需要 Builder 2n-2 轮才能迫使 Painter 在 n 个顶点上创建一条蓝色路径或任何红色循环。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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