Add to ORKGWe give a pathwise construction of a two-parameter family of purely-atomic-measure-valued diffusions in which ranked masses of atoms are stationary with the Poisson–Dirichlet(α,θ) distributions, for α∈(0,1) and θ≥0. These processes resolve a conjecture of Feng and Sun (Probab. Theory Related Fields 148 (2010) 501–525). We build on our previous work on (α,0)- and (α,α)-interval partition evolutions. The extension to general θ≥0 is achieved by the construction of a σ-finite excursion measure of a new measure-valued branching diffusion. Our measure-valued processes are Hunt processes on an incomplete subspace of the space of all probability measures and do not possess an extension to a Feller process. In a companion paper, we use generators to...
The two-parameter Poisson–Dirichlet diffusion, introduced in 2009 by Petrov, extends the infinitely-...
The focus of this dissertation is a class of random processes known as interacting measure-valued st...
We study measures on random partitions, arising from condensing stochastic particle systems with sta...
We give a pathwise construction of a two-parameter family of purely-atomic-measure-valued diffusions...
We introduce diffusions on a space of interval partitions of the unit interval that are stationary w...
Consider a spectrally positive Stable(1+α) process whose jumps we interpret as lifetimes of individu...
We introduce and study interval partition diffusions with Poisson--Dirichlet$(\alpha,\theta)$ statio...
This paper provides a countable representation for a class of infinite-dimensional diffusions which ...
This paper provides a countable representation for a class of infinite-dimensional diffusions which ...
The present work is about measure-valued diffusion processes, which are aligned with two distinct ge...
In 1990, Bertoin constructed a measure-valued Markov process in the framework of a Bessel process of...
Branching diffusions are introduced as a simple model of the growth of a population of rare mutant g...
Models of populations in which a type or location, represented by a point in a metric space E, is as...
The present paper provides exact expressions for the probability distributions of linear functionals...
AbstractStochastic models for gene frequencies can be viewed as probability-measure-valued processes...
The two-parameter Poisson–Dirichlet diffusion, introduced in 2009 by Petrov, extends the infinitely-...
The focus of this dissertation is a class of random processes known as interacting measure-valued st...
We study measures on random partitions, arising from condensing stochastic particle systems with sta...
We give a pathwise construction of a two-parameter family of purely-atomic-measure-valued diffusions...
We introduce diffusions on a space of interval partitions of the unit interval that are stationary w...
Consider a spectrally positive Stable(1+α) process whose jumps we interpret as lifetimes of individu...
We introduce and study interval partition diffusions with Poisson--Dirichlet$(\alpha,\theta)$ statio...
This paper provides a countable representation for a class of infinite-dimensional diffusions which ...
This paper provides a countable representation for a class of infinite-dimensional diffusions which ...
The present work is about measure-valued diffusion processes, which are aligned with two distinct ge...
In 1990, Bertoin constructed a measure-valued Markov process in the framework of a Bessel process of...
Branching diffusions are introduced as a simple model of the growth of a population of rare mutant g...
Models of populations in which a type or location, represented by a point in a metric space E, is as...
The present paper provides exact expressions for the probability distributions of linear functionals...
AbstractStochastic models for gene frequencies can be viewed as probability-measure-valued processes...
The two-parameter Poisson–Dirichlet diffusion, introduced in 2009 by Petrov, extends the infinitely-...
The focus of this dissertation is a class of random processes known as interacting measure-valued st...
We study measures on random partitions, arising from condensing stochastic particle systems with sta...