English

An Ergodic Theorem for Fleming-Viot Models in Random Environments

Probability 2017-01-13 v1

Abstract

The Fleming-Viot (FV) process is a measure-valued diffusion that models the evolution of type frequencies in a countable population which evolves under resampling (genetic drift), mutation, and selection. In the classic FV model the fitness (strength) of types is given by a measurable function. In this paper, we introduce and study the Fleming-Viot process in random environment (FVRE), when by random environment we mean the fitness of types is a stochastic process with c\`adl\`ag paths. We identify FVRE as the unique solution to a so called quenched martingale problem and derive some of its properties via martingale and duality methods. We develop the duality methods for general time-inhomogeneous and quenched martingale problems. In fact, some important aspects of the duality relations only appears for time-inhomogeneous (and quenched) martingale problems. For example, we see that duals evolve backward in time with respect to the main Markov process whose evolution is forward in time. Using a family of function-valued dual processes for FVRE, we prove that, as the number of individuals NN tends to \infty, the measure-valued Moran process μNeN\mu_N^{e_N} (with fitness process eNe_N) converges weakly in Skorokhod topology of c\`adl\`ag functions to the FVRE process μe\mu^e (with fitness process ee), if eNee_N \rightarrow e a.s. in Skorokhod topology of c\`adl\`ag functions. We also study the long-time behaviour of FVRE process (μte)t0(\mu_t^e)_{t\geq 0} joint with its fitness process e=(et)t0e=(e_t)_{t\geq 0} and prove that the joint FV-environment process (μte,et)t0(\mu_t^e,e_t)_{t\geq 0} is ergodic under the assumption of weak ergodicity of ee.

Keywords

Cite

@article{arxiv.1701.03224,
  title  = {An Ergodic Theorem for Fleming-Viot Models in Random Environments},
  author = {Arash Jamshidpey},
  journal= {arXiv preprint arXiv:1701.03224},
  year   = {2017}
}
R2 v1 2026-06-22T17:48:08.979Z