Time-dependent P\'olya urn

Abstract

We consider a time-dependent version of a P\'olya urn containing black and white balls. At each time n a ball is drawn from the urn at random and replaced in the urn along with σn additional balls of the same colour. The proportion of white balls converges almost surely to a random limit , and D=\∈\0,1\\ denotes the event when one of the colours dominates. The phase transition, in terms of the sequence (σn), between the regimes P(D)=1 and P(D)<1 was obtained by R. Pemantle in 1990. We describe the phase transition between the cases P(D)=0 and P(D)>0. Further, we study the stronger monopoly event M when one of the colours eventually stops reappearing, and analyse the phase transition between the regimes P(M)=0, P(M)∈ (0,1), and P(M)=1.