Structured coalescents, coagulation equations and multi-type branching processes

Abstract

Consider a structured population consisting of d colonies, with migration rates proportional to a positive parameter K. We sample NK individuals, distributed evenly across the d colonies, and trace their ancestral lineages backward in time. Within each colony, we assume that any pair of ancestral lineages coalesces at a constant rate, as in Kingman's coalescent. We identify each ancestral lineage with the set, or block, of its sampled descendants, and we encode the state of the system using a d-dimensional vector of empirical measures; the i-th component records the blocks present in colony i together with the initial locations of the lineages composing each block. We are interested in the asymptotic behavior of the process of empirical measures as K ∞. We consider two regimes: the critical sampling regime, where NK K, and the large-sample regime, where NK K. After an appropriate time rescaling, we show that the process of empirical measures converges to the solution of a d-dimensional coagulation equation. In the critical sampling regime, the solution can be represented in terms of a multi-type branching process. In the large-sample regime, the solution can be represented in terms of the entrance law of a multi-type continuous-state branching process.