The theory of general state-space Markov chains can be strongly related to the case of discrete state-space by use of the notion of small sets and associated minorization conditions. The general theory shows that small sets exist for all Markov chains on state-spaces with countably generated sigma-algebras, though the minorization provided by the theory concerns small sets of order n and n-step transition kernels for some unspecified n. Partly motivated by the growing importance of small sets for Markov chain Monte Carlo and Coupling from the Past, we show that in general there need be no small sets of order n = 1 even if the kernel is assumed to have a density function (though of course one can take n = 1 if the kernel density is continuou...
An imprecise Markov chain is defined by a closed convex set of transition matrices instead of a uniq...
M.Sc. (Mathematics)In chapter 1, we give the reader some background concerning digraphs that are use...
In this paper, we study first the problem of nonparametric estimation of the stationary density $f$ ...
The theory of general state-space Markov chains can be strongly related to the case of discrete stat...
AbstractThe theory of general state-space Markov chains can be strongly related to the case of discr...
Consider a finite irreducible Markov chain with invariant distribution pi. We use the inner product ...
We review notions of small sets, φ-irreducibility, etc., and present a simple proof of asymp...
The dissertation which follows is concerned with various aspects of behaviour within a set of state...
This paper is made available online in accordance with publisher policies. Please scroll down to vie...
. We develop quantitative bounds on rates of convergence for continuoustime Markov processes on gene...
Summary. Bounds on convergence rates for Markov chains are a very widely-studied topic, motivated la...
This paper surveys various results about Markov chains on general (non-countable) state spaces. It b...
When the initial and transition probabilities of a finite Markov chain in discrete time are not well...
This paper introduced a general class of mathematical models, Markov chain models, which are appropr...
In this paper we connect various topological and probabilistic forms of stability for discrete-time ...
An imprecise Markov chain is defined by a closed convex set of transition matrices instead of a uniq...
M.Sc. (Mathematics)In chapter 1, we give the reader some background concerning digraphs that are use...
In this paper, we study first the problem of nonparametric estimation of the stationary density $f$ ...
The theory of general state-space Markov chains can be strongly related to the case of discrete stat...
AbstractThe theory of general state-space Markov chains can be strongly related to the case of discr...
Consider a finite irreducible Markov chain with invariant distribution pi. We use the inner product ...
We review notions of small sets, φ-irreducibility, etc., and present a simple proof of asymp...
The dissertation which follows is concerned with various aspects of behaviour within a set of state...
This paper is made available online in accordance with publisher policies. Please scroll down to vie...
. We develop quantitative bounds on rates of convergence for continuoustime Markov processes on gene...
Summary. Bounds on convergence rates for Markov chains are a very widely-studied topic, motivated la...
This paper surveys various results about Markov chains on general (non-countable) state spaces. It b...
When the initial and transition probabilities of a finite Markov chain in discrete time are not well...
This paper introduced a general class of mathematical models, Markov chain models, which are appropr...
In this paper we connect various topological and probabilistic forms of stability for discrete-time ...
An imprecise Markov chain is defined by a closed convex set of transition matrices instead of a uniq...
M.Sc. (Mathematics)In chapter 1, we give the reader some background concerning digraphs that are use...
In this paper, we study first the problem of nonparametric estimation of the stationary density $f$ ...