From coalescing random walks on a torus to Kingman's coalescent

Abstract

Let TdN, d 2, be the discrete d-dimensional torus with Nd points. Place a particle at each site of TdN and let them evolve as independent, nearest-neighbor, symmetric, continuous-time random walks. Each time two particles meet, they coalesce into one. Denote by CN the first time the set of particles is reduced to a singleton. Cox [6] proved the existence of a time-scale θN for which CN/θN converges to the sum of independent exponential random variables. Denote by ZNt the total number of particles at time t. We prove that the sequence of Markov chains (ZNtθN)t 0 converges to the total number of partitions in Kingman's coalescent.