We consider an age-dependent branching particle system in ℝd, where the particles are subject to α-stable migration (0 < α ≤ 2), critical binary branching, and general (non-arithmetic) lifetimes distribution. The population starts off from a Poisson random field in ℝd with Lebesgue intensity. We prove functional central limit theorems and strong laws of large numbers under two rescalings: high particle density, and a space-time rescaling that preserves the migration distribution. Properties of the limit processes such as Markov property, almost sure continuity of paths and generalized Langevin equation, are also investigated
A branching process counted by a random characteristic has been defined as a process which at time t...
A branching random field with immigration is considered. The demographic variation process is a non-...
AbstractA branching process counted by a random characteristic has been defined as a process which a...
We consider an age-dependent branching particle system in ℝd, where the particles are subject to α-...
Abstract. We consider an age-dependent branching particle system in Rd, where the particles are subj...
A spatial branching process is considered in which particles have a lifetime law with a tail index s...
AbstractWe give functional limit theorems for the fluctuations of the rescaled occupation time proce...
A system of particles of k types in Rd is considered, where each particle, depending on its type, mi...
AbstractLet Z(t) be the population at time t of a critical age-dependent branching process. Suppose ...
AbstractWe give a functional limit theorem for the fluctuations of the rescaled occupation time proc...
AbstractA system of particles of k types in Rd is considered, where each particle, depending on its ...
AbstractA system of particles of k types with immigration in Rd is considered. Each particle, accord...
AbstractA measure-valued process which carries genealogical information is defined for a supercritic...
We prove a functional limit theorem for the rescaled occupation time fluctuations of a (d, α, β)-bra...
A spatial branching process is considered in which particles have a life time law with a tail index ...
A branching process counted by a random characteristic has been defined as a process which at time t...
A branching random field with immigration is considered. The demographic variation process is a non-...
AbstractA branching process counted by a random characteristic has been defined as a process which a...
We consider an age-dependent branching particle system in ℝd, where the particles are subject to α-...
Abstract. We consider an age-dependent branching particle system in Rd, where the particles are subj...
A spatial branching process is considered in which particles have a lifetime law with a tail index s...
AbstractWe give functional limit theorems for the fluctuations of the rescaled occupation time proce...
A system of particles of k types in Rd is considered, where each particle, depending on its type, mi...
AbstractLet Z(t) be the population at time t of a critical age-dependent branching process. Suppose ...
AbstractWe give a functional limit theorem for the fluctuations of the rescaled occupation time proc...
AbstractA system of particles of k types in Rd is considered, where each particle, depending on its ...
AbstractA system of particles of k types with immigration in Rd is considered. Each particle, accord...
AbstractA measure-valued process which carries genealogical information is defined for a supercritic...
We prove a functional limit theorem for the rescaled occupation time fluctuations of a (d, α, β)-bra...
A spatial branching process is considered in which particles have a life time law with a tail index ...
A branching process counted by a random characteristic has been defined as a process which at time t...
A branching random field with immigration is considered. The demographic variation process is a non-...
AbstractA branching process counted by a random characteristic has been defined as a process which a...