In this paper we propose a new method for approximating the nonstationary mo-ment dynamics of one dimensional Markovian birth-death processes. By expanding the transition probabilities of the Markov process in terms of Poisson-Charlier polynomials, we are able to estimate any moments of the Markov process even though the system of moment equations may not be closed. Using new weighted discrete Sobolev spaces, we derive explicit error bounds of the transition probabilities and new weak a priori estimates for approximating the moments of the Markov processs using a truncated form of the expansion. Using our error bounds and estimates, we are able to show that our approximations converge to the true stochastic process as we add more terms to t...
We consider Poisson's equation for quasi-birth-and-death processes (QBDs) and we exploit the special...
In this paper, we study birth/immigration-death processes under mild (binomial) catastrophes. We obt...
This paper studies birth and death processes in interactive random environments where the birth and ...
Submitted for publicationWe consider ordinary and conditional first passage times in a general birth...
International audienceWe consider ordinary and conditional first passage times in a general birth–de...
Many queueing systems have an arrival process that can be modeled by a Markov-modulated Poisson proc...
The article of record as published may be found at https://www.jstor.org/stable/1427338An efficient ...
For dealing numerically with the infinite-state-space Markov chains, a truncation of the state space...
We consider a strong Markov process with killing and prove an approximation method for the distribut...
We consider a strong Markov process with killing and prove an approximation method for the...
In this paper, we present the extension of the analysis of time-dependent limiting characteristics t...
Integral functionals of Markov processes are widely used in stochastic modeling for applications in ...
For a birth-death process N(t) with a reflecting state at 0 we propose a method able to construct a ...
Birth-death processes (BDPs) are continuous-time Markov chains that track the number of "particles" ...
Many important stochastic counting models can be written as general birth-death processes (BDPs). BD...
We consider Poisson's equation for quasi-birth-and-death processes (QBDs) and we exploit the special...
In this paper, we study birth/immigration-death processes under mild (binomial) catastrophes. We obt...
This paper studies birth and death processes in interactive random environments where the birth and ...
Submitted for publicationWe consider ordinary and conditional first passage times in a general birth...
International audienceWe consider ordinary and conditional first passage times in a general birth–de...
Many queueing systems have an arrival process that can be modeled by a Markov-modulated Poisson proc...
The article of record as published may be found at https://www.jstor.org/stable/1427338An efficient ...
For dealing numerically with the infinite-state-space Markov chains, a truncation of the state space...
We consider a strong Markov process with killing and prove an approximation method for the distribut...
We consider a strong Markov process with killing and prove an approximation method for the...
In this paper, we present the extension of the analysis of time-dependent limiting characteristics t...
Integral functionals of Markov processes are widely used in stochastic modeling for applications in ...
For a birth-death process N(t) with a reflecting state at 0 we propose a method able to construct a ...
Birth-death processes (BDPs) are continuous-time Markov chains that track the number of "particles" ...
Many important stochastic counting models can be written as general birth-death processes (BDPs). BD...
We consider Poisson's equation for quasi-birth-and-death processes (QBDs) and we exploit the special...
In this paper, we study birth/immigration-death processes under mild (binomial) catastrophes. We obt...
This paper studies birth and death processes in interactive random environments where the birth and ...