Strong Ramsey game on two boards

Abstract

The strong Ramsey game R(B, H) is a two-player game played on a graph B, referred to as the board, with a target graph H. In this game, two players, P1 and P2, alternately claim unclaimed edges of B, starting with P1. The goal is to claim a subgraph isomorphic to H, with the first player achieving this declared the winner. A fundamental open question, persisting for over three decades, asks whether there exists a graph H such that in the game R(Kn, H), P1 does not have a winning strategy in a bounded number of moves as n ∞. In this paper, we shift the focus to the variant R(Kn Kn, H), introduced by David, Hartarsky, and Tiba, where the board Kn Kn consists of two disjoint copies of Kn. We prove that there exist infinitely many graphs H such that P1 cannot win in R(Kn Kn, H) within a bounded number of moves through a concise proof. This perhaps provides evidence for the existence of examples to the above longstanding open problem.