We give computable bounds on the rate of convergence of the transition probabil-ities to the stationary distribution for a certain class of geometrically ergodic Markov chains. Our results are different from earlier estimates of Meyn and Tweedie, and from estimates using coupling, although we start from essentially the same assump-tions of a drift condition towards a “small set”. The estimates show a noticeable improvement on existing results if the Markov chain is reversible with respect to its stationary distribution, and especially so if the chain is also positive. The method of proof uses the first-entrance last-exit decomposition, together with new quantitative versions of a result of Kendall from discrete renewal theory
AbstractWe study the necessary and sufficient conditions for a finite ergodic Markov chain to conver...
This article continues work by Alsmeyer and Hoefs (Markov Process Relat. Fields 7 (2001) 325-348) on...
Quantitative geometric rates of convergence for reversible Markov chains are closely related to the ...
Using elementary methods, we prove that for a countable Markov chain P of ergodic degree d > 0 the r...
Let (Xn) be a positive recurrent Harris chain on a general state space, with invariant probability m...
AbstractLet (Xn) be a positive recurrent Harris chain on a general state space, with invariant proba...
In this paper, we investigate computable lower bounds for the best strongly ergodic rate of converg...
We improve the results from [Lindvall, T., 1979. On coupling of discrete renewal processes. Z. Wahrs...
UnrestrictedSince we have the preliminary fact that the irreducible, aperiodic and reversible Markov...
grantor: University of TorontoQuantitative geometric rates of convergence for reversible M...
Recent results for geometrically ergodic Markov chains show that there exist constants R ! 1; ae ! 1...
International audienceLet $(X_n)_{n \in\mathbb{N}}$ be a $V$-geometrically ergodic Markov chain on a...
We continue the work of improving the rate of convergence of ergodic homogeneous Markov chains. The ...
We generalize and simplify a result of Schervish and Carlin (1992) concerning the convergence of Mar...
AbstractQuantitative geometric rates of convergence for reversible Markov chains are closely related...
AbstractWe study the necessary and sufficient conditions for a finite ergodic Markov chain to conver...
This article continues work by Alsmeyer and Hoefs (Markov Process Relat. Fields 7 (2001) 325-348) on...
Quantitative geometric rates of convergence for reversible Markov chains are closely related to the ...
Using elementary methods, we prove that for a countable Markov chain P of ergodic degree d > 0 the r...
Let (Xn) be a positive recurrent Harris chain on a general state space, with invariant probability m...
AbstractLet (Xn) be a positive recurrent Harris chain on a general state space, with invariant proba...
In this paper, we investigate computable lower bounds for the best strongly ergodic rate of converg...
We improve the results from [Lindvall, T., 1979. On coupling of discrete renewal processes. Z. Wahrs...
UnrestrictedSince we have the preliminary fact that the irreducible, aperiodic and reversible Markov...
grantor: University of TorontoQuantitative geometric rates of convergence for reversible M...
Recent results for geometrically ergodic Markov chains show that there exist constants R ! 1; ae ! 1...
International audienceLet $(X_n)_{n \in\mathbb{N}}$ be a $V$-geometrically ergodic Markov chain on a...
We continue the work of improving the rate of convergence of ergodic homogeneous Markov chains. The ...
We generalize and simplify a result of Schervish and Carlin (1992) concerning the convergence of Mar...
AbstractQuantitative geometric rates of convergence for reversible Markov chains are closely related...
AbstractWe study the necessary and sufficient conditions for a finite ergodic Markov chain to conver...
This article continues work by Alsmeyer and Hoefs (Markov Process Relat. Fields 7 (2001) 325-348) on...
Quantitative geometric rates of convergence for reversible Markov chains are closely related to the ...