Ordered size Ramsey number of paths

doi:10.1016/j.dam.2019.02.002

Discrete Applied Mathematics

Volume 276, 15 April 2020, Pages 13-18

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Abstract

An ordered graph is a simple graph with an ordering on its vertices. Define the ordered path $P_{n}$ to be the monotone increasing path with $n$ edges. The ordered size Ramsey number $\tilde{r} (P_{r}, P_{s})$ is the minimum number $m$ for which there exists an ordered graph $H$ with $m$ edges such that every two-coloring of the edges of $H$ contains a red copy of $P_{r}$ or a blue copy of $P_{s}$ . For $2 \leq r \leq s$ , we show $\frac{1}{8} r^{2} s \leq \tilde{r} (P_{r}, P_{s}) \leq C r^{2} s {(log s)}^{3}$ , where $C > 0$ is an absolute constant. This problem is motivated by the recent results of Bucić et al. (2019) and Letzter and Sudakov (2019) for oriented graphs.

Keywords

Ramsey numbers

Paths

Ordered graphs

Cited by (0)

¹: Research is partially supported by National Science Foundation Grant DMS-1500121, Arnold O. Beckman Research Award (UIUC Campus Research Board RB 18132) and the Langan Scholar Fund (UIUC).