A general multi-type population model is considered, where individuals live and reproduce according to their age and type, but also under the influence of the size and composition of the entire population. We describe the dynamics of the population as a measure-valued process and obtain its asymptotics as the population grows with the environmental carrying capacity. Thus, a deterministic approximation is given, in the form of a law of large numbers, as well as a central limit theorem. This general framework is then adapted to model sexual reproduction, with a special section on serial monogamic mating systems
The classical Bienaymé-Galton-Watson (BGW) branching process can be interpreted as mathematical mode...
International audienceThis paper covers the elaboration of a general class of multitype branching pr...
AbstractWe propose a stochastic process model for a population of individuals of two types. Type-I i...
Classical branching processes, even the most general, share the property that individuals are suppos...
Abstract. The age structure of populations supercritical below and subcritical above a car-rying cap...
AbstractSupercritical branching processes are considered which are Markovian in the age structure bu...
In a recent paper [7] a coupling method was used to show that if population size, or more generally ...
2000 Mathematics Subject Classi cation: 60J80, 60F25.In this work we deal with a multitype branching...
We present a general class of multitype branching processes in discrete time with age, memory and po...
AbstractA branching process model where offspring distributions depend on the threshold as well as o...
Independence of reproducing individuals can be viewed as the very defining property of branching pro...
The age structure of populations supercritical below and subcritical above a carrying capacity is in...
The first chapter concerns monotype population models. We first study general birth and death proces...
Dependence of individual reproduction upon the size of the whole population is studied in a general ...
Stochastic encounter-mating (SEM) models describe monogamous permanent pair formation in finite zool...
The classical Bienaymé-Galton-Watson (BGW) branching process can be interpreted as mathematical mode...
International audienceThis paper covers the elaboration of a general class of multitype branching pr...
AbstractWe propose a stochastic process model for a population of individuals of two types. Type-I i...
Classical branching processes, even the most general, share the property that individuals are suppos...
Abstract. The age structure of populations supercritical below and subcritical above a car-rying cap...
AbstractSupercritical branching processes are considered which are Markovian in the age structure bu...
In a recent paper [7] a coupling method was used to show that if population size, or more generally ...
2000 Mathematics Subject Classi cation: 60J80, 60F25.In this work we deal with a multitype branching...
We present a general class of multitype branching processes in discrete time with age, memory and po...
AbstractA branching process model where offspring distributions depend on the threshold as well as o...
Independence of reproducing individuals can be viewed as the very defining property of branching pro...
The age structure of populations supercritical below and subcritical above a carrying capacity is in...
The first chapter concerns monotype population models. We first study general birth and death proces...
Dependence of individual reproduction upon the size of the whole population is studied in a general ...
Stochastic encounter-mating (SEM) models describe monogamous permanent pair formation in finite zool...
The classical Bienaymé-Galton-Watson (BGW) branching process can be interpreted as mathematical mode...
International audienceThis paper covers the elaboration of a general class of multitype branching pr...
AbstractWe propose a stochastic process model for a population of individuals of two types. Type-I i...