Online Ramsey numbers of ordered paths and cycles

Abstract

An ordered graph is a graph with a linear ordering on its vertices. The online Ramsey game for ordered graphs G and H is played on an infinite sequence of vertices; on each turn, Builder draws an edge between two vertices, and Painter colors it red or blue. Builder tries to create a red G or a blue H as quickly as possible, while Painter wants the opposite. The online ordered Ramsey number ro(G,H) is the number of turns the game lasts with optimal play. In this paper, we consider the behavior of ro(G,Pn) for fixed G, where Pn is the monotone ordered path. We prove an O(n 2n) bound on ro(G,Pn) for all G and an O(n) bound when G is 3-ichromatic; we partially classify graphs G with ro(G,Pn) = n + O(1). Many of these results extend to ro(G,Cn), where Cn is an ordered cycle obtained from Pn by adding one edge.