AbstractStarting from the cumulant semigroup of a measure-valued branching process, we construct the transition probabilities of some Markov process Y(β)=(Y(β)t, t ϵ R, which we call a measure-valued branching process with discrete immigration of unitβ. The immigration of Y(β) is governed by a Poisson random measure ρ on the time-distribution space and a probability generating function h, both depending on β. It is shown that, under suitable hypotheses, Y(β) approximates to a Markov process Y=(Yt, t ϵ R as β→0+. The latter is the one we call a measure-valued branching process with immigration. The convergence of branching particle systems with immigration is also studied
A branching random field with immigration is considered. The demographic variation process is a non-...
We consider a particle system in continuous time, discrete population, with spatial motion and nonlo...
AbstractA measure-valued process which carries genealogical information is defined for a supercritic...
Starting from the cumulant semigroup of a measure-valued branching process, we construct the transit...
AbstractStarting from the cumulant semigroup of a measure-valued branching process, we construct the...
In this note, we introduce a model of branching particle systems with immigration and show a result ...
The fluctuation limit of a measure-valued immigration process with small branching rate is considere...
Abstract. The measure-valued branching process with immigration is defined as Yt = Xt + It, t ≥ 0, w...
AbstractWe derive the probability generating function for the general Bellman—Harris age dependent b...
International audienceIn a multitype branching process, it is assumed that immigrants arrive accordi...
ABSTRACT. We consider a particles system, where, the particles move independently according to a Mar...
We consider a multitype branching process with immigration in a ran-dom environment introduced by Ke...
Consider a generalized renewal process where elements are replaced by a random number of new element...
Abstract. A special type of immigration associated with measure-valued branching processes is formul...
AbstractThe immigration structure associated with a measure-valued branching process may be describe...
A branching random field with immigration is considered. The demographic variation process is a non-...
We consider a particle system in continuous time, discrete population, with spatial motion and nonlo...
AbstractA measure-valued process which carries genealogical information is defined for a supercritic...
Starting from the cumulant semigroup of a measure-valued branching process, we construct the transit...
AbstractStarting from the cumulant semigroup of a measure-valued branching process, we construct the...
In this note, we introduce a model of branching particle systems with immigration and show a result ...
The fluctuation limit of a measure-valued immigration process with small branching rate is considere...
Abstract. The measure-valued branching process with immigration is defined as Yt = Xt + It, t ≥ 0, w...
AbstractWe derive the probability generating function for the general Bellman—Harris age dependent b...
International audienceIn a multitype branching process, it is assumed that immigrants arrive accordi...
ABSTRACT. We consider a particles system, where, the particles move independently according to a Mar...
We consider a multitype branching process with immigration in a ran-dom environment introduced by Ke...
Consider a generalized renewal process where elements are replaced by a random number of new element...
Abstract. A special type of immigration associated with measure-valued branching processes is formul...
AbstractThe immigration structure associated with a measure-valued branching process may be describe...
A branching random field with immigration is considered. The demographic variation process is a non-...
We consider a particle system in continuous time, discrete population, with spatial motion and nonlo...
AbstractA measure-valued process which carries genealogical information is defined for a supercritic...