Add to ORKGThe Fleming-Viot measure-valued diffusion arises as the infinite population limit of various discrete genetic models with general type space. The paper gives a countable construction of the process as the empirical measure carried by a certain interactive particle system. This explicit representation facilitates the study of various properties of the Fleming-Viot process. The construction also carries versions of the familiar genealogical processes from population genetics, in particular, Kingman's coalescent, thus unifying the genealogical and measure-valued approaches to the subject
We review recent progress in the understanding of the interplay between population models, measure-v...
AbstractIn this paper we formulate the stepping stone model in population genetics as a measure-valu...
We model spatially expanding populations by means of two spatial Λ-Fleming Viot processes (or SLFVs)...
Models of populations in which a type or location, represented by a point in a metric space E, is as...
The present work Provides an explicit Bayesian construction of some Fleming-Viot (F-V) measure-value...
This paper provides a construction in the Bayesian framework of the Fleming-Viot measure-valued diff...
In this paper of infinite systems of interacting measure-valued diffusions each with state space ([O...
We study exchangeable coalescent trees and the evolving genealogical trees in models for neutral hap...
Fleming-Viot processes incorporating mutation and selection are considered. It is well-known that if...
Abstract. If Y is a standard Fleming-Viot process with constant mutation rate (in the infinitely man...
A measure valued diffusion is discussed which describes the infinite-sites-model with stepping stone...
We consider the tree-valued Fleming–Viot process, (Xt)t≥0, with mutation and selection as studied in...
AbstractStochastic models for gene frequencies can be viewed as probability-measure-valued processes...
The purpose of this paper is to extend the investigation of the Fleming-Viot process in discrete spa...
We study the connection between a class of tree-valued processes, arising as the evolving genealogi...
We review recent progress in the understanding of the interplay between population models, measure-v...
AbstractIn this paper we formulate the stepping stone model in population genetics as a measure-valu...
We model spatially expanding populations by means of two spatial Λ-Fleming Viot processes (or SLFVs)...
Models of populations in which a type or location, represented by a point in a metric space E, is as...
The present work Provides an explicit Bayesian construction of some Fleming-Viot (F-V) measure-value...
This paper provides a construction in the Bayesian framework of the Fleming-Viot measure-valued diff...
In this paper of infinite systems of interacting measure-valued diffusions each with state space ([O...
We study exchangeable coalescent trees and the evolving genealogical trees in models for neutral hap...
Fleming-Viot processes incorporating mutation and selection are considered. It is well-known that if...
Abstract. If Y is a standard Fleming-Viot process with constant mutation rate (in the infinitely man...
A measure valued diffusion is discussed which describes the infinite-sites-model with stepping stone...
We consider the tree-valued Fleming–Viot process, (Xt)t≥0, with mutation and selection as studied in...
AbstractStochastic models for gene frequencies can be viewed as probability-measure-valued processes...
The purpose of this paper is to extend the investigation of the Fleming-Viot process in discrete spa...
We study the connection between a class of tree-valued processes, arising as the evolving genealogi...
We review recent progress in the understanding of the interplay between population models, measure-v...
AbstractIn this paper we formulate the stepping stone model in population genetics as a measure-valu...
We model spatially expanding populations by means of two spatial Λ-Fleming Viot processes (or SLFVs)...