Markov processes forced on a subspace by a large drift, with applications to population genetics

Abstract

Consider a sequence of Markov processes X1, X2,... with state space E, where XN has a strong drift to D ⊂eq E, such that (XN) is slow for some appropriate : E D. Using the method of martingale problems, we give a limit result, such that (XN) N∞ Z in the space of c\`adl\`ag paths, and XN N∞ X in measure. \\ We apply the general limit result to models for copy number variation of genetic elements in a diploid Moran model of size N. The population by time t is described by XN ∈ P( N0), where XNk is the frequency of individuals with copy number k, and $: P(