Ordered Ramsey numbers of graphs with m edges
Abstract
Given a vertex-ordered graph G, the ordered Ramsey number r<(G) is the minimum integer N such that every 2-coloring of the edges of the complete ordered graph KN contains a monochromatic ordered copy of G. Motivated by a similar question posed by Erdos and Graham in the unordered setting, we study the problem of bounding the ordered Ramsey number of any ordered graph G with m edges and no isolated vertices. We prove that r<(G) ≤ e109 m ( m)3/2 for any such G, which is tight up to the ( m)3/2 factor in the exponent. As a corollary, we obtain the corresponding bound for the oriented Ramsey number of a directed graph with m edges.
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