On ordered Ramsey numbers of matchings versus triangles

Abstract

For graphs G< and H< with linearly ordered vertex sets, the Ramsey number r<(G<,H<) is the smallest positive integer N such that any red-blue coloring of the edges of the complete ordered graph K<N on N vertices contains either a blue copy of G< or a red copy of H<. Motivated by a problem of Conlon, Fox, Lee, and Sudakov (2017), we study the numbers r<(M<,K<3) where M< is an ordered matching on n vertices. We prove that almost all n-vertex ordered matchings M< with interval chromatic number 2 satisfy r<(M<,K<3) ∈ ((n/ n)5/4) and r<(M<,K<3) ∈ O(n7/4), improving a recent result by Rohatgi (2019). We also show that there are n-vertex ordered matchings M< with interval chromatic number at least 3 satisfying r<(M<,K<3) ∈ ((n/ n)4/3), which asymptotically matches the best known lower bound on these off-diagonal ordered Ramsey numbers for general n-vertex ordered matchings.