We consider sequences of orthogonal polynomials with positive zeros, and pursue the question of how (partial) knowledge of the orthogonalizing measure for the {\it associated polynomials} can lead to information about the orthogonalizing measure for the original polynomials, with a view to applications in the setting of birth-death processes. In particular, we relate the supports of the two measures, and their moments of positive and negative orders. Our results indicate how the prevalence of recurrence or $\alpha$-recurrence in a birth-death process can be recognized from certain properties of an associated measure
We establish some representations for the smallest and largest zeros of orthogonal polynomials in te...
We display some representations for the rate of convergence of a birth-death process, which are usef...
We discuss some aspects of discrete-time birth-death processes or {\em random walks}, highlighting t...
We consider sequences of orthogonal polynomials and pursue the question of how (partial) knowledge o...
We consider birth-death processes on the nonnegative integers and the corresponding sequences of ort...
AbstractWe consider sequences of orthogonal polynomials and pursue the question of how (partial) kno...
AbstractWe consider birth–death processes on the nonnegative integers and the corresponding sequence...
Abstract. We consider sequences of polynomials that are defined by a three-terms recurrence relation...
The purpose of this paper is to extend some results of Karlin and McGregor's and Chihara's concernin...
Abstract. The purpose of this paper is to extend some results of Karlin and McGregor’s and Chihara’s...
The purpose of this paper is to extend some results of Karlin and McGregor's and Chihara's concernin...
This paper aims to clarify certain aspects of the relations between birth-death processes, measures ...
We consider sequences of orthogonal polynomials arising in the analysis of birth-death processes wit...
We consider sequences of orthogonal polynomials arising in the analysis of birth-death processes wit...
We discuss the connections between the 2-orthogonal polynomials and the generalized birth and death ...
We establish some representations for the smallest and largest zeros of orthogonal polynomials in te...
We display some representations for the rate of convergence of a birth-death process, which are usef...
We discuss some aspects of discrete-time birth-death processes or {\em random walks}, highlighting t...
We consider sequences of orthogonal polynomials and pursue the question of how (partial) knowledge o...
We consider birth-death processes on the nonnegative integers and the corresponding sequences of ort...
AbstractWe consider sequences of orthogonal polynomials and pursue the question of how (partial) kno...
AbstractWe consider birth–death processes on the nonnegative integers and the corresponding sequence...
Abstract. We consider sequences of polynomials that are defined by a three-terms recurrence relation...
The purpose of this paper is to extend some results of Karlin and McGregor's and Chihara's concernin...
Abstract. The purpose of this paper is to extend some results of Karlin and McGregor’s and Chihara’s...
The purpose of this paper is to extend some results of Karlin and McGregor's and Chihara's concernin...
This paper aims to clarify certain aspects of the relations between birth-death processes, measures ...
We consider sequences of orthogonal polynomials arising in the analysis of birth-death processes wit...
We consider sequences of orthogonal polynomials arising in the analysis of birth-death processes wit...
We discuss the connections between the 2-orthogonal polynomials and the generalized birth and death ...
We establish some representations for the smallest and largest zeros of orthogonal polynomials in te...
We display some representations for the rate of convergence of a birth-death process, which are usef...
We discuss some aspects of discrete-time birth-death processes or {\em random walks}, highlighting t...