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Evolving genealogies for branching populations under selection and competition

Authors :
Blancas, Airam
Gufler, Stephan
Kliem, Sandra
Tran, Viet-Chi
Wakolbinger, Anton
Instituto Tecnológico Autónomo de México (ITAM)
Department of mathematics, Goethe-university
Goethe-University Frankfurt am Main
Mathematisches Institut der Universität Leipzig
Universität Leipzig [Leipzig]
Laboratoire Analyse et Mathématiques Appliquées (LAMA)
Université Paris-Est Créteil Val-de-Marne - Paris 12 (UPEC UP12)-Centre National de la Recherche Scientifique (CNRS)-Université Gustave Eiffel
CONACyT
Zeff Fellowship, a postdoctoral fellowship of the Minerva Foundation
Israel Science Foundation (ISF) grant No. 1382/17
Binational Science Foundation (BSF) award 2018330
Deutsche Forschungsgemeinschaft (DFG, German Research Foundation) research grant contract number 2337/1-1, project 432176920
DFG - Project number 393092071
Chaire 'Modélisation Mathématique et Biodiversité' of Veolia Environnement-Ecole Polytechnique-Museum National d'Histoire Naturelle-Fondation X
DFG project WA 967/4-2 in the SPP 1590
Institute for Mathematical Sciences, National University of Singapore
European Union (ERC-AdG SINGER-101054787)
ANR-11-LABX-0007,CEMPI,Centre Européen pour les Mathématiques, la Physique et leurs Interactions(2011)
ANR-10-LABX-0058,Bézout,Models and algorithms: from the discrete to the continuous(2010)
Deutsche Forschungsgemeinschaft (DFG, German Research Foundation) research grant contract number 2337/1-1
Tran, Viet Chi
Laboratoires d'excellence - Centre Européen pour les Mathématiques, la Physique et leurs Interactions - - CEMPI2011 - ANR-11-LABX-0007 - LABX - VALID
Laboratoires d'excellence - Models and algorithms: from the discrete to the continuous - - Bézout2010 - ANR-10-LABX-0058 - LABX - VALID
Publication Year :
2022
Publisher :
HAL CCSD, 2022.

Abstract

For a continuous state branching process with two types of individuals which are subject to selection and density dependent competition, we characterize the joint evolution of population size, type configurations and genealogies as the unique strong solution of a system of SDE's. Our construction is achieved in the lookdown framework and provides a synthesis as well as a generalization of cases considered separately in two seminal papers by Donnelly and Kurtz (1999), namely fluctuating population sizes under neutrality, and selection with constant population size. As a conceptual core in our approach we introduce the selective lookdown space which is obtained from its neutral counterpart through a state-dependent thinning of ``potential'' selection/competition events whose rates interact with the evolution of the type densities. The updates of the genealogical distance matrix at the ``active'' selection/competition events are obtained through an appropriate sampling from the selective lookdown space. The solution of the above mentioned system of SDE's is then mapped into the joint evolution of population size and symmetrized type configurations and genealogies, i.e. marked distance matrix distributions. By means of Kurtz' Markov mapping theorem, we characterize the latter process as the unique solution of a martingale problem. For the sake of transparency we restrict the main part of our presentation to a prototypical example with two types, which contains the essential features. In the final section we outline an extension to processes with multiple types including mutation.<br />This version takes the suggestions of two anonymous referees into account, which led to an improvement in the presentation and to some corrections in the proofs in Section 5

Details

Language :
English
Database :
OpenAIRE
Accession number :
edsair.doi.dedup.....31e013f7104c18b239ce296ddb0efd5c