We study a spatial branching model, where the underlying motion is d-dimensional (d≥1) Brownian motion and the branching rate is affected by a random collection of reproduction suppressing sets dubbed mild obstacles. The main result of this paper is the quenched law of large numbers for the population for all d≥1. We also show that the branching Brownian motion with mild obstacles spreads less quickly than ordinary branching Brownian motion by giving an upper estimate on its speed. When the underlying motion is an arbitrary diffusion process, we obtain a dichotomy for the quenched local growth that is independent of the Poissonian intensity. More general offspring distributions (beyond the dyadic one considered in the main theorems) as well...
We consider a population with non-overlapping generations, whose size goes to infinity. It...
AbstractWe prove a convergence theorem for a sequence of super-Brownian motions moving among hard Po...
We study critical branching random walks (BRWs) U(n) on where the displacement of an offspring fro...
Abstract. We study a spatial branching model, where the underlying motion is d-dimensional (d ≥ 1) B...
We study a $d$-dimensional branching Brownian motion (BBM) among Poissonian obstacles, where a rando...
Branching Brownian motion is a random particle system which incorporates both the tree-like structur...
31 pagesWe study supercritical branching Brownian motion on the real line starting at the origin and...
International audienceIn this article, we study the extremal processes of branching Brownian motion...
We consider a model of branching Brownian motions in random environment associated with the Poisson ...
We give necessary and sufficient conditions for laws of large numbers to hold in L2 for the empirica...
For a set A ⊂ C[0, ∞), we give new results on the growth of the number of particles in a branching B...
We establish weak and strong laws of large numbers for a class of branching symmetric Hunt processes...
We study analytically the order and gap statistics of particles at time t for the one dimensional br...
This article concerns branching Brownian motion (BBM) with dyadic branching at rate β|y|p for a part...
We consider three different settings for branching processes with spatial structure which appear in ...
We consider a population with non-overlapping generations, whose size goes to infinity. It...
AbstractWe prove a convergence theorem for a sequence of super-Brownian motions moving among hard Po...
We study critical branching random walks (BRWs) U(n) on where the displacement of an offspring fro...
Abstract. We study a spatial branching model, where the underlying motion is d-dimensional (d ≥ 1) B...
We study a $d$-dimensional branching Brownian motion (BBM) among Poissonian obstacles, where a rando...
Branching Brownian motion is a random particle system which incorporates both the tree-like structur...
31 pagesWe study supercritical branching Brownian motion on the real line starting at the origin and...
International audienceIn this article, we study the extremal processes of branching Brownian motion...
We consider a model of branching Brownian motions in random environment associated with the Poisson ...
We give necessary and sufficient conditions for laws of large numbers to hold in L2 for the empirica...
For a set A ⊂ C[0, ∞), we give new results on the growth of the number of particles in a branching B...
We establish weak and strong laws of large numbers for a class of branching symmetric Hunt processes...
We study analytically the order and gap statistics of particles at time t for the one dimensional br...
This article concerns branching Brownian motion (BBM) with dyadic branching at rate β|y|p for a part...
We consider three different settings for branching processes with spatial structure which appear in ...
We consider a population with non-overlapping generations, whose size goes to infinity. It...
AbstractWe prove a convergence theorem for a sequence of super-Brownian motions moving among hard Po...
We study critical branching random walks (BRWs) U(n) on where the displacement of an offspring fro...