We consider sequences of polynomials that are defined by a three-terms recurrence relation and orthogonal with respect to a positive measure on the nonnegative axis. By a famous result of Karlin and McGregor such sequences are instrumental in the analysis of birth-death processes. Inspired by problems and results in this stochastic setting we present necessary and sufficient conditions in terms of the parameters in the recurrence relation for the smallest or second smallest point in the support of the orthogonalizing measure to be larger than zero, and for the support to be discrete with no finite limit point
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 consider sequences of orthogonal polynomials arising in the analysis of birth-death processes wit...
We consider sequences of polynomials that are defined by a three-terms recurrence relation and ortho...
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...
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...
We consider sequences of orthogonal polynomials with positive zeros, and pursue the question of how ...
We consider sequences of polynomials that are defined by a three-terms recurrence relation and ortho...
We consider birth-death processes on the nonnegative integers and the corresponding sequences of ort...
Abstract. We consider birth-death processes on the nonnegative integers and the corresponding sequen...
Abstract: We consider sequences of orthogonal polynomials and pursue the question of how (partial) k...
We consider sequences of orthogonal polynomials and pursue the question of how (partial) knowledge o...
We consider sequences of orthogonal polynomials and pursue the question of how (partial) knowledge o...
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 consider sequences of orthogonal polynomials arising in the analysis of birth-death processes wit...
We consider sequences of polynomials that are defined by a three-terms recurrence relation and ortho...
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...
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...
We consider sequences of orthogonal polynomials with positive zeros, and pursue the question of how ...
We consider sequences of polynomials that are defined by a three-terms recurrence relation and ortho...
We consider birth-death processes on the nonnegative integers and the corresponding sequences of ort...
Abstract. We consider birth-death processes on the nonnegative integers and the corresponding sequen...
Abstract: We consider sequences of orthogonal polynomials and pursue the question of how (partial) k...
We consider sequences of orthogonal polynomials and pursue the question of how (partial) knowledge o...
We consider sequences of orthogonal polynomials and pursue the question of how (partial) knowledge o...
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 consider sequences of orthogonal polynomials arising in the analysis of birth-death processes wit...