International audienceWe consider a class of birth-and-death processes describing a population made of $d$ sub-populations of different types which interact with one another. The state space is $\mathbb{Z}^d_+$ (unbounded). We assume that the population goes almost surely to extinction, so that the unique stationary distribution is the Dirac measure at the origin. These processes are parametrized by a scaling parameter $K$ which can be thought as the order of magnitude of the total size of the population at time $0$. For any fixed finite time span, it is well-known that such processes, when renormalized by $K$, are close, in the limit $K\to+\infty$, to the solutions of a certain differential equation in $\mathbb{R}^d_+$ whose vector field ...
Limit theorems constitute a classical and important field in probability theory. In several applicat...
We consider a class of processes describing a population consisting of k types of individuals. The p...
This thesis is devoted to the mathematical study of stochastic modelds of structured populations dyn...
International audienceWe consider a class of birth-and-death processes describing a population made ...
International audienceWe study a class of multi-species birth-and-death processes going almost surel...
We study the probabilistic evolution of a birth and death continuous time measure-valued process wi...
This survey concerns the study of quasi-stationary distributions with a specific focus on models der...
This article studies the quasi-stationary behaviour of multidimensional birth and death processes, m...
This article studies the quasi-stationary behaviour of population processes with unbounded absorptio...
65 pagesInternational audienceThis survey concerns the study of quasi-stationary distributions with ...
We consider birth-death processes on the nonnegative integers, where $\{1,2,...\}$ is an irreducible...
International audienceWe establish sufficient conditions for exponential convergence to a unique qua...
AbstractWe consider birth–death processes on the nonnegative integers, where {1,2,…} is an irreducib...
Limit theorems constitute a classical and important field in probability theory. In several applicat...
We consider a class of processes describing a population consisting of k types of individuals. The p...
This thesis is devoted to the mathematical study of stochastic modelds of structured populations dyn...
International audienceWe consider a class of birth-and-death processes describing a population made ...
International audienceWe study a class of multi-species birth-and-death processes going almost surel...
We study the probabilistic evolution of a birth and death continuous time measure-valued process wi...
This survey concerns the study of quasi-stationary distributions with a specific focus on models der...
This article studies the quasi-stationary behaviour of multidimensional birth and death processes, m...
This article studies the quasi-stationary behaviour of population processes with unbounded absorptio...
65 pagesInternational audienceThis survey concerns the study of quasi-stationary distributions with ...
We consider birth-death processes on the nonnegative integers, where $\{1,2,...\}$ is an irreducible...
International audienceWe establish sufficient conditions for exponential convergence to a unique qua...
AbstractWe consider birth–death processes on the nonnegative integers, where {1,2,…} is an irreducib...
Limit theorems constitute a classical and important field in probability theory. In several applicat...
We consider a class of processes describing a population consisting of k types of individuals. The p...
This thesis is devoted to the mathematical study of stochastic modelds of structured populations dyn...