Multi-colour competition with reinforcement

Abstract

We study a system of interacting urns where balls of different colour/type compete for their survival, and annihilate upon contact. For competition between two types, the underlying graph (finite and connected), determining the interaction between the urns, is known to be irrelevant for the possibility of coexistence, whereas for K3 types the structure of the graph does affect the possibility of coexistence. We show that when the underlying graph is a cycle, competition between K3 types almost surely has a single survivor, thus establishing a conjecture of Griffiths, Janson, Morris and the first author. Along the way, we give a detailed description of an auto-annihilative process on the cycle, which can be perceived as an expression of the geometry of a M\"obius strip in a discrete setting.