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 − 1, so that the increments of the corresponding Markov chains are at least −1; a transition matrix L_{i,j} i,j≥0 is said to be almost lower triangular if L_{i,j} ≥ 0 ⇒ j ≤ i + 1, and then, the increments of the corresponding Markov chains are at most +1. In the present paper, we characterize the recurrence, positive recurrence and invariant distribution for the class of almost triangular transition matrices. The upper case appears to be the simplest in many ways, with existence and uniqueness of invariant measures, when in the lower case, existence as well as uniqueness are not guaranteed. We present the time-reversal connection between uppe...
AbstractBy using stochastic calculus for pure jump martingales, we study a class of infinite-dimensi...
In this thesis, we explore Markov chains with random transition matrices. Such chains are a developm...
Markov chains are considered with emphasis on the compution of exact and approximate stationary dist...
AbstractThe paper consists of two parts. In the first part, we consider two matrices that appear in ...
This paper investigates stochastic finite matrices and the corresponding finite Markov chains constr...
AbstractIn this paper we analyze properties of transition matrices T∈Rn,n of regular Markov chains w...
AbstractLet T∈Rn×n be an irreducible stochastic matrix with stationary distribution vector π. Set A=...
Arista J, Bisi E, O'Connell N. Matrix Whittaker processes. Probability Theory and Related Fields. 20...
In this paper, we study Markov chains with infinite state block-structured transition ma-trices, who...
A spectral Favard theorem for bounded banded lower Hessenberg matrices that admit a positive bidiago...
In this paper, we present some algebraic properties of a particular class of probability transition ...
AbstractKingman and Williams [6] showed that a pattern of positive elements can occur in a transitio...
Questions are posed regarding the influence that the column sums of the transition probabilities of ...
AbstractIt is proved that there exist two Markov transition matrices which are not identical but whi...
enin et al. (2000) recently introduced the idea of similarity in the context of birth-death processe...
AbstractBy using stochastic calculus for pure jump martingales, we study a class of infinite-dimensi...
In this thesis, we explore Markov chains with random transition matrices. Such chains are a developm...
Markov chains are considered with emphasis on the compution of exact and approximate stationary dist...
AbstractThe paper consists of two parts. In the first part, we consider two matrices that appear in ...
This paper investigates stochastic finite matrices and the corresponding finite Markov chains constr...
AbstractIn this paper we analyze properties of transition matrices T∈Rn,n of regular Markov chains w...
AbstractLet T∈Rn×n be an irreducible stochastic matrix with stationary distribution vector π. Set A=...
Arista J, Bisi E, O'Connell N. Matrix Whittaker processes. Probability Theory and Related Fields. 20...
In this paper, we study Markov chains with infinite state block-structured transition ma-trices, who...
A spectral Favard theorem for bounded banded lower Hessenberg matrices that admit a positive bidiago...
In this paper, we present some algebraic properties of a particular class of probability transition ...
AbstractKingman and Williams [6] showed that a pattern of positive elements can occur in a transitio...
Questions are posed regarding the influence that the column sums of the transition probabilities of ...
AbstractIt is proved that there exist two Markov transition matrices which are not identical but whi...
enin et al. (2000) recently introduced the idea of similarity in the context of birth-death processe...
AbstractBy using stochastic calculus for pure jump martingales, we study a class of infinite-dimensi...
In this thesis, we explore Markov chains with random transition matrices. Such chains are a developm...
Markov chains are considered with emphasis on the compution of exact and approximate stationary dist...