Rigorous results for a population model with selection II: genealogy of the population

Abstract

We consider a model of a population of fixed size N undergoing selection. Each individual acquires beneficial mutations at rate μN, and each beneficial mutation increases the individual's fitness by sN. Each individual dies at rate one, and when a death occurs, an individual is chosen with probability proportional to the individual's fitness to give birth. Under certain conditions on the parameters μN and sN, we show that the genealogy of the population can be described by the Bolthausen-Sznitman coalescent. This result confirms predictions of Desai, Walczak, and Fisher (2013), and Neher and Hallatschek (2013).