AbstractWe prove functional limits theorems for the occupation time process of a system of particles moving independently in Rd according to a symmetric α-stable Lévy process, and starting from an inhomogeneous Poisson point measure with intensity measure μ(dx)=(1+|x|γ)−1dx,γ>0, and other related measures. In contrast to the homogeneous case (γ=0), the system is not in equilibrium and ultimately it becomes locally extinct in probability, and there are more different types of occupation time limit processes depending on arrangements of the parameters γ,d and α. The case γ<d<α leads to an extension of fractional Brownian motion
We consider infinite systems of independent Markov chains as processes on the space of particle conf...
We prove a functional ergodic theorem for the occupation time process of a (d,[alpha],[beta])-branch...
AbstractWe consider a system of particles moving independently on a countable state space, according...
AbstractWe prove functional limits theorems for the occupation time process of a system of particles...
Abstract. Functional limit theorems are presented for the re-scaled occupation time fluctuation proc...
distribution-valued process, sub-fractional Brownian motion We consider particle systems in R with i...
AbstractWe give a functional limit theorem for the fluctuations of the rescaled occupation time proc...
AbstractWe study the large deviations and the central limit theorem for the occupation time function...
We prove a functional limit theorem for the rescaled occupation time fluctuations of a (d, α, β)-bra...
AbstractWe give functional limit theorems for the fluctuations of the rescaled occupation time proce...
We show that the centred occupation time process of the origin of a system of critical binary branch...
We show that the centred occupation time process of the origin of a system of critical binary branch...
Let the nodes of a Poisson point process move independently in Rd according to Brownian motions. We ...
AbstractFor a Poisson high-density system of independent motions in Rd we consider the corresponding...
AbstractWe consider a branching system consisting of particles moving according to a Markov family i...
We consider infinite systems of independent Markov chains as processes on the space of particle conf...
We prove a functional ergodic theorem for the occupation time process of a (d,[alpha],[beta])-branch...
AbstractWe consider a system of particles moving independently on a countable state space, according...
AbstractWe prove functional limits theorems for the occupation time process of a system of particles...
Abstract. Functional limit theorems are presented for the re-scaled occupation time fluctuation proc...
distribution-valued process, sub-fractional Brownian motion We consider particle systems in R with i...
AbstractWe give a functional limit theorem for the fluctuations of the rescaled occupation time proc...
AbstractWe study the large deviations and the central limit theorem for the occupation time function...
We prove a functional limit theorem for the rescaled occupation time fluctuations of a (d, α, β)-bra...
AbstractWe give functional limit theorems for the fluctuations of the rescaled occupation time proce...
We show that the centred occupation time process of the origin of a system of critical binary branch...
We show that the centred occupation time process of the origin of a system of critical binary branch...
Let the nodes of a Poisson point process move independently in Rd according to Brownian motions. We ...
AbstractFor a Poisson high-density system of independent motions in Rd we consider the corresponding...
AbstractWe consider a branching system consisting of particles moving according to a Markov family i...
We consider infinite systems of independent Markov chains as processes on the space of particle conf...
We prove a functional ergodic theorem for the occupation time process of a (d,[alpha],[beta])-branch...
AbstractWe consider a system of particles moving independently on a countable state space, according...