Online Ramsey numbers of ordered graphs

Abstract

The online ordered Ramsey game is played between two players, Builder and Painter, on an infinite sequence of vertices with ordered graphs (G1,G2), which have linear orderings on their vertices. On each turn, Builder first selects an edge before Painter colors it red or blue. Builder's objective is to construct either an ordered red copy of G1 or an ordered blue copy of G2, while Painter's objective is to delay this for as many turns as possible. The online ordered Ramsey number ro(G1,G2) is the number of turns Builder takes to win in the case that both players play optimally. Few lower bounds are known for this quantity. In this paper, we introduce a succinct proof of a new lower bound based on the maximum left- and right-degrees in the ordered graphs. We also upper bound ro(G1,G2) in two cases: when G1 is a cycle and G2 a complete bipartite graph, and when G1 is a tree and G2 a clique.