Strongly reinforced P\'olya urns with graph-based competition

Abstract

We introduce a class of reinforcement models where, at each time step t, one first chooses a random subset At of colours (independent of the past) from n colours of balls, and then chooses a colour i from this subset with probability proportional to the number of balls of colour i in the urn raised to the power α>1. We consider stability of equilibria for such models and establish the existence of phase transitions in a number of examples, including when the colours are the edges of a graph, a context which is a toy model for the formation and reinforcement of neural connections.