Spatial Λ-Fleming Viot processes, or SLFVs, are a family of models describing the evolution of genetic diversity for populations living in a spatial continuum. Their main characteristic is their "event-based" reproduction dynamics, which makes it possible to control local reproduction rates. Therefore, they are particularly suited to the study of populations living in unbounded regions.
In this talk, I will show how the SLFV modelling framework can be extended to spatially expanding populations, giving rise to two family of processes: ∞-parent SLFV processes, which are a measure-valued analog of continuous first-passage percolation, and k-parent SLFV processes, in which local extinctions due to low local population densities are possible. I will show that when k → +∞, the k-parent SLFV converges in distribution towards the ∞-parent SLFV. I will then present what is currently known of the growth properties of these processes.
Based on a joint work with Amandine Véber (MAP5, Univ. Paris Cité) and an ongoing work with Matt Roberts (Univ. Bath) and Jan Lukas Igelbrink (GU Frankfurt and JGU Mainz).
Apolline Louvet
Stochastic measure-valued processes for populations expanding in a spatial continuum
Mardi, 20 Juin, 2023 - 14:30 à 15:30
Résumé :
Institution de l'orateur :
University of Bath
Thème de recherche :
Probabilités
Salle :
4