This paper provides a countable representation for a class of infinite-dimensional diffusions which extends the infinitely-many-neutral-alleles model and is related to the two-parameter Poisson- Dirichlet process. By means of Gibbs sampling procedures, we define a reversible Moran-type population process. The associated process of ranked relative frequencies of types is shown to converge in distribution to the two-parameter family of diffusions, which is stationary and er- godic with respect to the two-parameter Poisson-Dirichlet distribution. The construction provides interpretation for the limiting process in terms of individual dynamics
We consider a Markov chain on the space of (countable) partitions of the interval [0; 1], obtained f...
By means of a representation as interactive particle systems, dual processes are constructed for a l...
The background of the reaction-diffusion processes can be found in Haken[4] and Yan and Lee[11]. For...
This paper provides a countable representation for a class of infinite-dimensional diffusions which ...
The two-parameter Poisson–Dirichlet diffusion, introduced in 2009 by Petrov, extends the infinitely-...
We give a pathwise construction of a two-parameter family of purely-atomic-measure-valued diffusions...
The Fleming-Viot measure-valued diffusion arises as the infinite population limit of various discret...
We introduce diffusions on a space of interval partitions of the unit interval that are stationary w...
This dissertation in mathematics is devoted to systems consisting of a countably infinite collection...
ii This thesis is centered around three infinite dimensional diffusion processes: (i). the infinitel...
Models of populations in which a type or location, represented by a point in a metric space E, is as...
This paper studies countable systems of linearly and hierarchically interacting diffusions taking va...
AbstractIn this paper we formulate the stepping stone model in population genetics as a measure-valu...
We give a pathwise construction of a two-parameter family of purely-atomic-measure-valued diffusions...
Stochastic processes in infinite dimensional state spaces provide a mathematical description of vari...
We consider a Markov chain on the space of (countable) partitions of the interval [0; 1], obtained f...
By means of a representation as interactive particle systems, dual processes are constructed for a l...
The background of the reaction-diffusion processes can be found in Haken[4] and Yan and Lee[11]. For...
This paper provides a countable representation for a class of infinite-dimensional diffusions which ...
The two-parameter Poisson–Dirichlet diffusion, introduced in 2009 by Petrov, extends the infinitely-...
We give a pathwise construction of a two-parameter family of purely-atomic-measure-valued diffusions...
The Fleming-Viot measure-valued diffusion arises as the infinite population limit of various discret...
We introduce diffusions on a space of interval partitions of the unit interval that are stationary w...
This dissertation in mathematics is devoted to systems consisting of a countably infinite collection...
ii This thesis is centered around three infinite dimensional diffusion processes: (i). the infinitel...
Models of populations in which a type or location, represented by a point in a metric space E, is as...
This paper studies countable systems of linearly and hierarchically interacting diffusions taking va...
AbstractIn this paper we formulate the stepping stone model in population genetics as a measure-valu...
We give a pathwise construction of a two-parameter family of purely-atomic-measure-valued diffusions...
Stochastic processes in infinite dimensional state spaces provide a mathematical description of vari...
We consider a Markov chain on the space of (countable) partitions of the interval [0; 1], obtained f...
By means of a representation as interactive particle systems, dual processes are constructed for a l...
The background of the reaction-diffusion processes can be found in Haken[4] and Yan and Lee[11]. For...