The Karlin-McGregor representation for the transition probabilities of a birth-death process with an absorbing bottom state involves a sequence of orthogonal polynomials and the corresponding measure. This representation can be generalized to a setting in which a transition to the absorbing state ({\em killing}) is possible from any state rather than just one state. The purpose of this paper is to investigate to what extent properties of birth-death processes, in particular with regard to the existence of quasi-stationary distributions, remain valid in the generalized setting. It turns out that the elegant structure of the theory of quasi-stationarity for birth-death processes remains intact as long as killing is possible from only finitely...
This paper is concerned with the circumstances under which a discrete-time absorbing Markov chain ha...
Abstract. We study birth-death processes on the non-negative integers where {1, 2,...} is an irreduc...
For Markov processes on the positive integers with the origin as an absorbing state, Ferrari, Kesten...
The Karlin-McGregor representation for the transition probabilities of a birth-death process with an...
Abstract. The Karlin-McGregor representation for the transition probabili-ties of a birth-death proc...
We consider birth-death processes on the nonnegative integers, where $\{1,2,...\}$ is an irreducible...
The purpose of this note is to point out that Karlin and McGregor's integral representation for the ...
AbstractWe consider birth–death processes on the nonnegative integers, where {1,2,…} is an irreducib...
We study two aspects of discrete-time birth-death processes, the common feature of which is the cent...
This article studies the quasi-stationary behaviour of multidimensional birth and death processes, m...
We discuss the connections between the 2-orthogonal polynomials and the generalized birth and death ...
For evanescent Markov processes with a single transient communicating class, it is often of interest...
We consider birth-death processes on the nonnegative integers and the corresponding sequences of ort...
Abstract: In this paper a spectral theory pertaining to Quasi-Birth-Death Processes (QBDs) is prese...
For evanescent Markov processes with a single transient communicating class, it is often of interest...
This paper is concerned with the circumstances under which a discrete-time absorbing Markov chain ha...
Abstract. We study birth-death processes on the non-negative integers where {1, 2,...} is an irreduc...
For Markov processes on the positive integers with the origin as an absorbing state, Ferrari, Kesten...
The Karlin-McGregor representation for the transition probabilities of a birth-death process with an...
Abstract. The Karlin-McGregor representation for the transition probabili-ties of a birth-death proc...
We consider birth-death processes on the nonnegative integers, where $\{1,2,...\}$ is an irreducible...
The purpose of this note is to point out that Karlin and McGregor's integral representation for the ...
AbstractWe consider birth–death processes on the nonnegative integers, where {1,2,…} is an irreducib...
We study two aspects of discrete-time birth-death processes, the common feature of which is the cent...
This article studies the quasi-stationary behaviour of multidimensional birth and death processes, m...
We discuss the connections between the 2-orthogonal polynomials and the generalized birth and death ...
For evanescent Markov processes with a single transient communicating class, it is often of interest...
We consider birth-death processes on the nonnegative integers and the corresponding sequences of ort...
Abstract: In this paper a spectral theory pertaining to Quasi-Birth-Death Processes (QBDs) is prese...
For evanescent Markov processes with a single transient communicating class, it is often of interest...
This paper is concerned with the circumstances under which a discrete-time absorbing Markov chain ha...
Abstract. We study birth-death processes on the non-negative integers where {1, 2,...} is an irreduc...
For Markov processes on the positive integers with the origin as an absorbing state, Ferrari, Kesten...