Service life of many real-life systems cannot be considered infinite, and thus the systems will be eventually stopped or will break down. Some of them may be re-launched after possible maintenance under likely new initial conditions. In such systems, which are often modelled by birth and death processes, the assumption of stationarity may be too strong and performance characteristics obtained under this assumption may not make much sense. In such circumstances, time-dependent analysis is more meaningful. In this paper, transient analysis of one class of Markov processes defined on non-negative integers, specifically, inhomogeneous birth and death processes allowing special transitions from and to the origin, is carried out. Whenever the pro...
This research determined the manner of convergence of certain Markov processes to their steady state...
The main substance of the paper concerns the growth rate and the classification (ergodicity, transie...
AbstractWe study the asymptotic behavior of maximum values of birth and death processes over large t...
Service life of many real-life systems cannot be considered infinite, and thus the systems will be e...
In this paper, we present the extension of the analysis of time-dependent limiting characteristics t...
We consider a multidimensional inhomogeneous birth-death process. In this paper, a general situation...
We study two aspects of discrete-time birth-death processes, the common feature of which is the cent...
AbstractConditions for a birth-death process to be exponentially ergodic are established. It is show...
Abstract: In this paper we study a transient birth and death Markov process penalized by its sojourn...
A new structure with the special property that instantaneous resurrection and mass disaster are impo...
This paper proposes some analytical results that may facilitate long-term staffing problem in high-l...
Birth-death processes are discrete-state, continuous-time Markov jump processes with one-step jumps....
For a birth-death process N(t) with a reflecting state at 0 we propose a method able to construct a ...
This paper studies birth and death processes in interactive random environments where the birth and ...
For an ergodic continuous-time birth and death process on the nonnegative integers, a well-known the...
This research determined the manner of convergence of certain Markov processes to their steady state...
The main substance of the paper concerns the growth rate and the classification (ergodicity, transie...
AbstractWe study the asymptotic behavior of maximum values of birth and death processes over large t...
Service life of many real-life systems cannot be considered infinite, and thus the systems will be e...
In this paper, we present the extension of the analysis of time-dependent limiting characteristics t...
We consider a multidimensional inhomogeneous birth-death process. In this paper, a general situation...
We study two aspects of discrete-time birth-death processes, the common feature of which is the cent...
AbstractConditions for a birth-death process to be exponentially ergodic are established. It is show...
Abstract: In this paper we study a transient birth and death Markov process penalized by its sojourn...
A new structure with the special property that instantaneous resurrection and mass disaster are impo...
This paper proposes some analytical results that may facilitate long-term staffing problem in high-l...
Birth-death processes are discrete-state, continuous-time Markov jump processes with one-step jumps....
For a birth-death process N(t) with a reflecting state at 0 we propose a method able to construct a ...
This paper studies birth and death processes in interactive random environments where the birth and ...
For an ergodic continuous-time birth and death process on the nonnegative integers, a well-known the...
This research determined the manner of convergence of certain Markov processes to their steady state...
The main substance of the paper concerns the growth rate and the classification (ergodicity, transie...
AbstractWe study the asymptotic behavior of maximum values of birth and death processes over large t...