AbstractIt is shown that population dependent branching processes for large values of threshold can be approximated by Gaussian processes centered at the iterates of the corresponding deterministic function. If the deterministic system has a stable limit cycle, then in the vicinity of the cycle points the corresponding stochastic system can be approximated by an autoregressive process. It is shown that it is possible to speed up convergence to the limit so that the processes converge weakly to the stationary autoregressive process. Similar results hold for noisy dynamical systems when random noise satisfies certain conditions and the corresponding dynamical system has stable limit cycles
2000 Mathematics Subject Classification: Primary 60J80, Secondary 60G99.In the paper a modification ...
Our motivation comes from the large population approximation of individual based models in populatio...
Weak convergence of time series processes, as the length of the discretetime interval between observ...
AbstractA branching process model where offspring distributions depend on the threshold as well as o...
2000 Mathematics Subject Classification: 60J80, 60K05.We consider the model of alternating branching...
Density dependent Markov population processes in large populations of size N were shown by Kurtz (19...
We consider a family of stationary Gaussian processes that includes the stationary Ornstein-Uhlenbec...
This thesis is devoted to the mathematical study of stochastic modelds of structured populations dyn...
AbstractThis paper considers a Markov branching process modified to allow decrements which occur ran...
This paper studies: (i) the long-time behaviour of the empirical distribution of age and normalized ...
AbstractStochastic approximations of the form Xn + 1 = Xn + anh(Xn, ξn) are treated where h(·, ·) mi...
International audienceWe consider Bienaymé-Galton-Watson and continuous-time Markov branching proces...
AbstractA necessary and sufficient condition is given for the convergence in probability of a stocha...
AbstractIn this work we derive the usual limit laws (weak and strong convergence, central limit theo...
38 pages, 32 ref. Submitted to Stochastic Processes and their ApplicationsDensity-dependent Markov c...
2000 Mathematics Subject Classification: Primary 60J80, Secondary 60G99.In the paper a modification ...
Our motivation comes from the large population approximation of individual based models in populatio...
Weak convergence of time series processes, as the length of the discretetime interval between observ...
AbstractA branching process model where offspring distributions depend on the threshold as well as o...
2000 Mathematics Subject Classification: 60J80, 60K05.We consider the model of alternating branching...
Density dependent Markov population processes in large populations of size N were shown by Kurtz (19...
We consider a family of stationary Gaussian processes that includes the stationary Ornstein-Uhlenbec...
This thesis is devoted to the mathematical study of stochastic modelds of structured populations dyn...
AbstractThis paper considers a Markov branching process modified to allow decrements which occur ran...
This paper studies: (i) the long-time behaviour of the empirical distribution of age and normalized ...
AbstractStochastic approximations of the form Xn + 1 = Xn + anh(Xn, ξn) are treated where h(·, ·) mi...
International audienceWe consider Bienaymé-Galton-Watson and continuous-time Markov branching proces...
AbstractA necessary and sufficient condition is given for the convergence in probability of a stocha...
AbstractIn this work we derive the usual limit laws (weak and strong convergence, central limit theo...
38 pages, 32 ref. Submitted to Stochastic Processes and their ApplicationsDensity-dependent Markov c...
2000 Mathematics Subject Classification: Primary 60J80, Secondary 60G99.In the paper a modification ...
Our motivation comes from the large population approximation of individual based models in populatio...
Weak convergence of time series processes, as the length of the discretetime interval between observ...