On the Speed of Coming Down from Infinity for $\Xi$-Coalescent Processes

Vlada Limic

Type: Article

Publication Date: 2010-01-01

Citations: 10

DOI: https://doi.org/10.1214/ejp.v15-742

Abstract

The $\Xi$-coalescent processes were initially studied by Möhle and Sagitov (2001), and introduced by Schweinsberg (2000) in their full generality. They arise in the mathematical population genetics as the complete class of scaling limits for genealogies of Cannings' models. The $\Xi$-coalescents generalize $\Lambda$-coalescents, where now simultaneous multiple collisions of blocks are possible. The standard version starts with infinitely many blocks at time $0$, and it is said to come down from infinity if its number of blocks becomes immediately finite, almost surely. This work builds on the technique introduced recently by Berstycki, Berestycki and Limic (2009), and exhibits deterministic ``speed'' function - an almost sure small time asymptotic to the number of blocks process, for a large class of $\Xi$-coalescents that come down from infinity.

Locations

Electronic Journal of Probability - View - PDF

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+ PDF Chat	On the size of the block of 1 for Ξ-coalescents with dust	2017	Fabian Freund Martin Möhle
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+	Smaller population size at the MRCA time for stationary branching processes	2012	Yu-Ting Chen Jean‐François Delmas
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+	Approximation of stochastic processes by nonexpansive flows and coming down from infinity	2019	Vincent Bansaye
+	Asymptotic sampling formulae for -coalescents	2012	Julien Berestycki Vlada Limic
+	Second-order asymptotics for the block counting process in a class of regularly varying ${\Lambda}$-coalescents	2015	Vlada Limic Anna Talarczyk
+	Conditions for exchangeable coalescents to come down from infinity	2012	Philip Herriger Martin Möhle Eberhard Karls

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+ PDF Chat	Stochastic flows associated to coalescent processes. III. Limit theorems	2006	Jean Bertoin Jean‐François Le Gall
+ PDF Chat	A Classification of Coalescent Processes for Haploid Exchangeable Population Models	2001	Martin Möhle Serik Sagitov
+	The general coalescent with asynchronous mergers of ancestral lines	1999	Serik Sagitov
+ PDF Chat	Small-time behavior of beta coalescents	2008	Julien Berestycki Nathanaël Berestycki Jason Schweinsberg
+ PDF Chat	Global divergence of spatial coalescents	2010	Omer Angel Nathanaël Berestycki Vlada Limic
+ PDF Chat	The spatial $\Lambda$-coalescent	2006	Vlada Limic Anja Sturm
+ PDF Chat	A Necessary and Sufficient Condition for the $\Lambda$-Coalescent to Come Down from Infinity.	2000	Jason Schweinsberg
+ PDF Chat	Coalescents With Multiple Collisions	1999	Jim Pitman
+ PDF Chat	Stochastic flows associated to coalescent processes	2003	Jean Bertoin Jean-Françcois Le Gall
+ PDF Chat	Coalescents with Simultaneous Multiple Collisions	2000	Jason Schweinsberg