Title of article
Stochastic flows associated to coalescent processes
Author/Authors
Bertoin، Jean نويسنده , , Gall، Jean-Francois Le نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2003
Pages
-260
From page
261
To page
0
Abstract
We study a class of stochastic flows connected to the coalescent processes that have been studied recently by M?hle, Pitman, Sagitov and Schweinsberg in connection with asymptotic models for the genealogy of populations with a large fixed size. We define a bridge to be a right-continuous process (B(r),r(element of)[0,1]) with nondecreasing paths and exchangeable increments, such that B(0)=0 and B(1)=1. We show that flows of bridges are in one-to-one correspondence with the so-called exchangeable coalescents. This yields an infinite-dimensional version of the classical Kingman representation for exchangeable partitions of N We then propose a Poissonian construction of a general class of flows of bridges and identify the associated coalescents. We also discuss an important auxiliary measure-valued process, which is closely related to the genealogical structure coded by the coalescent and can be viewed as a generalized Fleming-Viot process.
Keywords
Function algebra , Toeplitz representation , C^*-algebra
Journal title
PROBABILITY THEORY AND RELATED FIELDS
Serial Year
2003
Journal title
PROBABILITY THEORY AND RELATED FIELDS
Record number
73133
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