Add to ORKGWe study the ergodicity of backward product of stochastic and doubly stochastic matrices by introducing the concept of absolute infinite flow property. We show that this property is necessary for ergodicity of any chain of stochastic matrices, by defining and exploring the properties of a rotational transformation for a stochastic chain. Then, we establish that the absolute infinite flow property is equivalent to ergodicity for doubly stochastic chains. Furthermore, we develop a rate of convergence result for ergodic doubly stochastic chains. We also investigate the limiting behavior of a doubly stochastic chain and show that the product of doubly stochastic matrices is convergent up to a permutation sequence. Finally, we apply the results ...
The study deals with products of independent uniformly distributed matrices of the second order. The...
Abstract — We consider the consensus and ergodicity for a random linear discrete-time system driven ...
AbstractA notion of ergodicity is defined by analogy to homogeneous chains, and a necessary and suff...
We study the ergodicity of backward product of stochastic and doubly stochas-tic matrices by introdu...
In this paper we discuss the ergodicity of stochastic and doubly stochastic chains. We define absolu...
AbstractFor a sequence of stochastic matrices {Qk}∞k=0 we establish conditions for weak ergodicity o...
AbstractFor a sequence of stochastic matrices we consider conditions for weak ergodicity of infinite...
The paper deals with the convergence properties of the products of random (row-)stochastic matrices....
This thesis is mainly concerned with the study of product of random stochastic matrices and random w...
In recent years, some interest has been devoted to studying doubly stochastic Markov chains. These c...
Abstract — In this paper, we investigate limiting behavior of linear dynamic systems driven by rando...
AbstractThe work started by V. M. Maksimov [1970, Theory Probab. Appl. 15, 604–618], and continued b...
35 pagesInternational audienceWe introduce an statistical mechanical formalism for the study of disc...
AbstractWe show that infinite locally finite doubly stochastic matrices are particular limits of seq...
Abstract—We consider the ergodicity and consensus problem for a discrete-time linear dynamic model d...
The study deals with products of independent uniformly distributed matrices of the second order. The...
Abstract — We consider the consensus and ergodicity for a random linear discrete-time system driven ...
AbstractA notion of ergodicity is defined by analogy to homogeneous chains, and a necessary and suff...
We study the ergodicity of backward product of stochastic and doubly stochas-tic matrices by introdu...
In this paper we discuss the ergodicity of stochastic and doubly stochastic chains. We define absolu...
AbstractFor a sequence of stochastic matrices {Qk}∞k=0 we establish conditions for weak ergodicity o...
AbstractFor a sequence of stochastic matrices we consider conditions for weak ergodicity of infinite...
The paper deals with the convergence properties of the products of random (row-)stochastic matrices....
This thesis is mainly concerned with the study of product of random stochastic matrices and random w...
In recent years, some interest has been devoted to studying doubly stochastic Markov chains. These c...
Abstract — In this paper, we investigate limiting behavior of linear dynamic systems driven by rando...
AbstractThe work started by V. M. Maksimov [1970, Theory Probab. Appl. 15, 604–618], and continued b...
35 pagesInternational audienceWe introduce an statistical mechanical formalism for the study of disc...
AbstractWe show that infinite locally finite doubly stochastic matrices are particular limits of seq...
Abstract—We consider the ergodicity and consensus problem for a discrete-time linear dynamic model d...
The study deals with products of independent uniformly distributed matrices of the second order. The...
Abstract — We consider the consensus and ergodicity for a random linear discrete-time system driven ...
AbstractA notion of ergodicity is defined by analogy to homogeneous chains, and a necessary and suff...