On Exceptional Times for generalized Fleming-Viot Processes with Mutations
Abstract
If is a standard Fleming-Viot process with constant mutation rate (in the infinitely many sites model) then it is well known that for each the measure is purely atomic with infinitely many atoms. However, Schmuland proved that there is a critical value for the mutation rate under which almost surely there are exceptional times at which is a finite sum of weighted Dirac masses. In the present work we discuss the existence of such exceptional times for the generalized Fleming-Viot processes. In the case of Beta-Fleming-Viot processes with index we show that - irrespectively of the mutation rate and - the number of atoms is almost surely always infinite. The proof combines a Pitman-Yor type representation with a disintegration formula, Lamperti's transformation for self-similar processes and covering results for Poisson point processes.
Cite
@article{arxiv.1304.1342,
title = {On Exceptional Times for generalized Fleming-Viot Processes with Mutations},
author = {Julien Berestycki and Leif Doering and Leonid Mytnik and Lorenzo Zambotti},
journal= {arXiv preprint arXiv:1304.1342},
year = {2013}
}