Abstract. The paper is devoted to Professor Andrzej Lasota’s contribution to the ergodic theory of stochastic operators. We have selected some of his important papers and shown their influence on the evolution of this topic. We emphasize the role A. Lasota played in promoting abstract mathematical theories by showing their applications. The article is focused exclusively on ergodic properties of discrete stochastic semigroups {Pn: n ≥ 0}. Nevertheless, almost all of Lasota’s results presented here have their one-parameter conti-nuous semigroup analogs
AbstractA new theorem for asymptotic stability of Markov semigroups is proved. This result is applie...
This book is about stability of linear dynamical systems, discrete and continuous. More precisely, w...
In this paper, we introduce and study non-local Jacobi operators, which generalize the classical (lo...
The paper is devoted to Professor Andrzej Lasota's contribution to the ergodic theory of stochastic ...
The paper is devoted to Professor Andrzej Lasota's contribution to the ergodic theory of stochastic ...
This thesis is concerned with the quantified asymptotic theory of operator semigroups and its applic...
We develop a new approach for investigation of asymptotic behavior of Markov semigroup on preduals o...
The problem to be treated in this note is concerned with the asymptotic behaviour of stochastic semi...
We investigate ergodic properties of Markov semigroups in von Neumann algebras with the help of the ...
AbstractWe develop a new approach for investigation of asymptotic behavior of Markov semigroup on pr...
We study several aspects of the asymptotic behavior of semigroups of kernel operators. On the one ha...
We are mainly concerned with the asymptotic behaviour of both discrete and continuous semigroups of...
This thesis deals with Markov operators and semigroups. A Markov operator is a positive linear opera...
The discrete and continuous parameter forms of the mean ergodic theorem conclude that 1 N ∑ n=0 N-1T...
International audienceFeynman-Kac semigroups appear in various areas of mathematics: non-linear filt...
AbstractA new theorem for asymptotic stability of Markov semigroups is proved. This result is applie...
This book is about stability of linear dynamical systems, discrete and continuous. More precisely, w...
In this paper, we introduce and study non-local Jacobi operators, which generalize the classical (lo...
The paper is devoted to Professor Andrzej Lasota's contribution to the ergodic theory of stochastic ...
The paper is devoted to Professor Andrzej Lasota's contribution to the ergodic theory of stochastic ...
This thesis is concerned with the quantified asymptotic theory of operator semigroups and its applic...
We develop a new approach for investigation of asymptotic behavior of Markov semigroup on preduals o...
The problem to be treated in this note is concerned with the asymptotic behaviour of stochastic semi...
We investigate ergodic properties of Markov semigroups in von Neumann algebras with the help of the ...
AbstractWe develop a new approach for investigation of asymptotic behavior of Markov semigroup on pr...
We study several aspects of the asymptotic behavior of semigroups of kernel operators. On the one ha...
We are mainly concerned with the asymptotic behaviour of both discrete and continuous semigroups of...
This thesis deals with Markov operators and semigroups. A Markov operator is a positive linear opera...
The discrete and continuous parameter forms of the mean ergodic theorem conclude that 1 N ∑ n=0 N-1T...
International audienceFeynman-Kac semigroups appear in various areas of mathematics: non-linear filt...
AbstractA new theorem for asymptotic stability of Markov semigroups is proved. This result is applie...
This book is about stability of linear dynamical systems, discrete and continuous. More precisely, w...
In this paper, we introduce and study non-local Jacobi operators, which generalize the classical (lo...