We consider a spatial branching process with emigration in which children either remain at the same site as their parents or migrate to new locations and then found their own colonies. We are interested in asymptotics of the partition of the total population into colonies for large populations with rare migrations. Under appropriate regimes, we establish weak convergence of the rescaled partition to some ran-dom measure that is constructed from the restriction of a Poisson point measure to a certain random region, and whose cumulant solves a simple integral equation. 1. Introduction. Imagin
AbstractMotivated by the statistical applications, the asymptotic behavior of certain functionals of...
Starting from the cumulant semigroup of a measure-valued branching process, we construct the transit...
The branching random walk is a Galton-Watson process with the additional feature that pe...
Published in Annals of Applied Probability vol. 20, n. 6 (2010) pp. 1967-1988We consider a spatial b...
We consider a particle system in continuous time, a discrete population, with spatial motion, and no...
A population has two types of individuals, with each occupying an island. One of those, where indivi...
Seneta (1968) gave a sufficient condition for a limiting stationary distribution by allowing immigra...
Abstract. The measure-valued branching process with immigration is defined as Yt = Xt + It, t ≥ 0, w...
ABSTRACT. We consider a particles system, where, the particles move independently according to a Mar...
The branching migration processes generalize the classical Bienaymé - Watson process allowing a migr...
We consider a multitype branching process with immigration in a ran-dom environment introduced by Ke...
AbstractThis paper considers a population process where individuals reproduce according to an age-de...
We consider a branching model for a population of dividing cells infected by para-sites. Each cell r...
Abstract. We consider a branching process with Poissonian immigration where individuals have inherit...
AbstractSome limit theorems are obtained for the population size of a critical Bienaymé-Galton-Watso...
AbstractMotivated by the statistical applications, the asymptotic behavior of certain functionals of...
Starting from the cumulant semigroup of a measure-valued branching process, we construct the transit...
The branching random walk is a Galton-Watson process with the additional feature that pe...
Published in Annals of Applied Probability vol. 20, n. 6 (2010) pp. 1967-1988We consider a spatial b...
We consider a particle system in continuous time, a discrete population, with spatial motion, and no...
A population has two types of individuals, with each occupying an island. One of those, where indivi...
Seneta (1968) gave a sufficient condition for a limiting stationary distribution by allowing immigra...
Abstract. The measure-valued branching process with immigration is defined as Yt = Xt + It, t ≥ 0, w...
ABSTRACT. We consider a particles system, where, the particles move independently according to a Mar...
The branching migration processes generalize the classical Bienaymé - Watson process allowing a migr...
We consider a multitype branching process with immigration in a ran-dom environment introduced by Ke...
AbstractThis paper considers a population process where individuals reproduce according to an age-de...
We consider a branching model for a population of dividing cells infected by para-sites. Each cell r...
Abstract. We consider a branching process with Poissonian immigration where individuals have inherit...
AbstractSome limit theorems are obtained for the population size of a critical Bienaymé-Galton-Watso...
AbstractMotivated by the statistical applications, the asymptotic behavior of certain functionals of...
Starting from the cumulant semigroup of a measure-valued branching process, we construct the transit...
The branching random walk is a Galton-Watson process with the additional feature that pe...