The Moran process on a random graph

Abstract

We study the fixation probability for two versions of the Moran process on the random graph Gn,p at the threshold for connectivity. The Moran process models the spread of a mutant population in a network. Throughtout the process there are vertices of two types, mutants and non-mutants. Mutants have fitness s and non-mutants have fitness 1. The process starts with a unique individual mutant located at the vertex v0. In the Birth-Death version of the process a random vertex is chosen proportional to its fitness and then changes the type of a random neighbor to its own. The process continues until the set of mutants X is empty or [n]. In the Death-Birth version a uniform random vertex is chosen and then takes the type of a random neighbor, chosen according to fitness. The process again continues until the set of mutants X is empty or [n]. The fixation probability is the probability that the process ends with X=. We give asymptotically correct estimates of the fixation probability that depend on degree of v0 and its neighbors.,