Online size Ramsey numbers: Odd cycles vs connected graphs

Abstract

Given two graph families H1 and H2, a size Ramsey game is played on the edge set of KN. In every round, Builder selects an edge and Painter colours it red or blue. Builder is trying to force Painter to create as soon as possible a red copy of a graph from H1 or a blue copy of a graph from H2. The online (size) Ramsey number r( H1, H2) is the smallest number of rounds in the game provided Builder and Painter play optimally. We prove that if H1 is the family of all odd cycles and H2 is the family of all connected graphs on n vertices and m edges, then r( H1, H2) n + m-2+1, where is the golden ratio, and for n 3, m (n-1)2/4 we have r( H1, H2) n+2m+O(m-n+1). We also show that r(C3,Pn) 3n-4 for n 3. As a consequence we get 2.6n-3 r(C3,Pn) 3n-4 for every n 3.