We show how the mean of a monotone function (defined on a state space equipped with a partial ordering) can be estimated, using ergodic averages calculated from upper and lower dominating processes of a stationary irreducible Markov chain. In particular, we do not need to simulate the stationary Markov chain and we eliminate the problem of whether an appropriate burn-in is determined or not. Moreover, when a central limit theorem applies, we show how confidence intervals for the mean can be estimated by bounding the asymptotic variance of the ergodic average based on the equilibrium chain
Stochastic analysis of a multirate linear system typically requires the signals in the system to pos...
International audienceThis book concerns discrete-time homogeneous Markov chains that admit an invar...
We study the average behaviour of imprecise Markov chains; a generalised type of Markov chain where ...
We show how the mean of a monotone function (defined on a state space equipped with a partial orderi...
We show how the mean of a monotone function (defined on a state space equipped with a partial orderi...
International audienceConsider a stochastic process X on a finite state space X = {1,. .. , d}. It i...
The ergodic control problem for semi-Markov processes is reformulated as an optimization problem ove...
The following paper, first written in 1974, was never published other than as part of an internal re...
We provide an elementary proof that ergodic measures on one-sided shift spaces are ‘uniformly scalin...
The discrete and continuous parameter forms of the mean ergodic theorem conclude that as N --> [infi...
A sequence (sn) of integers is good for the mean ergodic theorem if for each invertible measure-pres...
AbstractThe paper examines multiplicative ergodic theorems and the related multiplicative Poisson eq...
It is known that Dobrushin's ergodicity coefficient is one of the effective tools in the investigati...
We propose strongly consistent estimators of the ℓ1 norm of the sequence of α-mixing (respectively β...
In this paper, we investigate computable lower bounds for the best strongly ergodic rate of converg...
Stochastic analysis of a multirate linear system typically requires the signals in the system to pos...
International audienceThis book concerns discrete-time homogeneous Markov chains that admit an invar...
We study the average behaviour of imprecise Markov chains; a generalised type of Markov chain where ...
We show how the mean of a monotone function (defined on a state space equipped with a partial orderi...
We show how the mean of a monotone function (defined on a state space equipped with a partial orderi...
International audienceConsider a stochastic process X on a finite state space X = {1,. .. , d}. It i...
The ergodic control problem for semi-Markov processes is reformulated as an optimization problem ove...
The following paper, first written in 1974, was never published other than as part of an internal re...
We provide an elementary proof that ergodic measures on one-sided shift spaces are ‘uniformly scalin...
The discrete and continuous parameter forms of the mean ergodic theorem conclude that as N --> [infi...
A sequence (sn) of integers is good for the mean ergodic theorem if for each invertible measure-pres...
AbstractThe paper examines multiplicative ergodic theorems and the related multiplicative Poisson eq...
It is known that Dobrushin's ergodicity coefficient is one of the effective tools in the investigati...
We propose strongly consistent estimators of the ℓ1 norm of the sequence of α-mixing (respectively β...
In this paper, we investigate computable lower bounds for the best strongly ergodic rate of converg...
Stochastic analysis of a multirate linear system typically requires the signals in the system to pos...
International audienceThis book concerns discrete-time homogeneous Markov chains that admit an invar...
We study the average behaviour of imprecise Markov chains; a generalised type of Markov chain where ...