Online Ramsey numbers of the claw versus cycles

Abstract

The online Ramsey number r(G,H) is defined via a Builder--Painter game on an empty graph with countably many vertices. In each round, Builder reveals an edge, which Painter immediately colors either red or blue. Builder wins once a red copy of G or a blue copy of H appears, and r(G,H) is the minimum number of edges Builder must reveal to force a win. For a long cycle C, the online Ramsey numbers r(G,C) are known only for a few specific choices of G. In particular, exact values were determined for G=P3 by Cyman, Dzido, Lapinskas, and Lo (Electron. J. Combin., 2015), while asymptotically tight results were obtained when G is an even cycle by Adamski, Bednarska-Bzdega, and Blazej (SIAM J. Discrete Math., 2024). In this paper, we consider the case where G is the claw K1,3 and determine the exact value of r(K1,3,C). We show that \[ r(K1,3,C)= 3(+1)2 for all 13. \]