Add to ORKGThis paper investigates stochastic finite matrices and the corresponding finite Markov chains constructed using recurrence matrices for general families of orthogonal polynomials and multiple orthogonal polynomials. The paper explores the spectral theory of transition matrices, utilizing both orthogonal and multiple orthogonal polynomials. Several properties are derived, including classes, periodicity, recurrence, stationary states, ergodicity, expected recurrence times, time-reversed chains, and reversibility. Furthermore, the paper uncovers factorization in terms of pure birth and pure death processes. The case study focuses on hypergeometric orthogonal polynomials, where all the computations can be carried out effectively. Particularly w...
The transition probabilities for the queueing model where potential customers are discouraged by que...
and 4.9. In this handout, we indicate more completely the properties of the eigenvalues of a stochas...
International audienceGiven a finite Markov chain, we investigate the first minors of the transition...
A spectral Favard theorem for bounded banded lower Hessenberg matrices that admit a positive bidiago...
AbstractWe describe and investigate a class of Markovian models based on a form of “dynamic occupanc...
About two dozens of exactly solvable Markov chains on one-dimensional finite and semi-infinite integ...
Inspired by the classical spectral analysis of birth-death chains using orthogonal polynomials, we s...
A transition matrix U_{i,j} i,j≥0 on N is said to be almost upper triangular if U_{i,j} ≥ 0 ⇒ j ≥ i ...
The transition probabilities for the queueing model where potential customers are discouraged by que...
AbstractWe describe and investigate a class of Markovian models based on a form of “dynamic occupanc...
Abstract. We consider sequences of polynomials that are defined by a three-terms recurrence relation...
We consider sequences of polynomials that are defined by a three-terms recurrence relation and ortho...
To study finite Markov chains, we begin with the theory of order relations to classify states and ch...
We consider sequences of polynomials that are defined by a three-terms recurrence relation and ortho...
AbstractWe discuss some aspects of discrete-time birth-death processes or random walks, highlighting...
The transition probabilities for the queueing model where potential customers are discouraged by que...
and 4.9. In this handout, we indicate more completely the properties of the eigenvalues of a stochas...
International audienceGiven a finite Markov chain, we investigate the first minors of the transition...
A spectral Favard theorem for bounded banded lower Hessenberg matrices that admit a positive bidiago...
AbstractWe describe and investigate a class of Markovian models based on a form of “dynamic occupanc...
About two dozens of exactly solvable Markov chains on one-dimensional finite and semi-infinite integ...
Inspired by the classical spectral analysis of birth-death chains using orthogonal polynomials, we s...
A transition matrix U_{i,j} i,j≥0 on N is said to be almost upper triangular if U_{i,j} ≥ 0 ⇒ j ≥ i ...
The transition probabilities for the queueing model where potential customers are discouraged by que...
AbstractWe describe and investigate a class of Markovian models based on a form of “dynamic occupanc...
Abstract. We consider sequences of polynomials that are defined by a three-terms recurrence relation...
We consider sequences of polynomials that are defined by a three-terms recurrence relation and ortho...
To study finite Markov chains, we begin with the theory of order relations to classify states and ch...
We consider sequences of polynomials that are defined by a three-terms recurrence relation and ortho...
AbstractWe discuss some aspects of discrete-time birth-death processes or random walks, highlighting...
The transition probabilities for the queueing model where potential customers are discouraged by que...
and 4.9. In this handout, we indicate more completely the properties of the eigenvalues of a stochas...
International audienceGiven a finite Markov chain, we investigate the first minors of the transition...