English

On edge-ordered Ramsey numbers

Combinatorics 2019-08-22 v2

Abstract

An edge-ordered graph is a graph with a linear ordering of its edges. Two edge-ordered graphs are equivalent if their is an isomorphism between them preserving the ordering of the edges. The edge-ordered Ramsey number redge(H;q)r_{edge}(H; q) of an edge-ordered graph HH is the smallest NN such that there exists an edge-ordered graph GG on NN vertices such that, for every qq-coloring of the edges of GG, there is a monochromatic subgraph of GG equivalent to HH. Recently, Balko and Vizer announced that redge(H;q)r_{edge}(H;q) exists. However, their proof uses the Graham-Rothschild theorem and consequently gives an enormous upper bound on these numbers. We give a new proof giving a much better bound. We prove that for every edge-ordered graph HH on nn vertices, we have redge(H;q)2cqn2q2logqnr_{edge}(H;q) \leq 2^{c^qn^{2q-2}\log^q n}, where cc is an absolute constant. We also explore the edge-ordered Ramsey number of sparser graphs and prove a polynomial bound for edge-ordered graphs of bounded degeneracy. We also prove a strengthening for edge-labeled graphs, graphs where every edge is given a label and the labels do not necessary have an ordering.

Keywords

Cite

@article{arxiv.1906.08234,
  title  = {On edge-ordered Ramsey numbers},
  author = {Jacob Fox and Ray Li},
  journal= {arXiv preprint arXiv:1906.08234},
  year   = {2019}
}

Comments

31 pages

R2 v1 2026-06-23T09:58:17.377Z