AbstractWe consider the problem of giving explicit spectral bounds for time inhomogeneous Markov chains on a finite state space. We give bounds that apply when there exists a probability π such that each of the different steps corresponds to a nice ergodic Markov kernel with stationary measure π. For instance, our results provide sharp bounds for models such as semi-random transpositions and semi-random insertions (in these cases π is the uniform probability on the symmetric group)
We study the spectral theory of a reversible Markov chain associated to a hypoelliptic random walk o...
Bounds on convergence rates for Markov chains are a very widely-studied topic, motivated largely by ...
Summary. Bounds on convergence rates for Markov chains are a very widely-studied topic, motivated la...
AbstractWe consider the problem of giving explicit spectral bounds for time inhomogeneous Markov cha...
We continue the work of improving the rate of convergence of ergodic homogeneous Markov chains. The ...
AbstractFor finite Markov chains the eigenvalues of P can be used to characterize the chain and also...
An approach is proposed to the construction of general lower bounds for the rate of convergence of p...
In this thesis, we deal with the upper and lower bounds for the mixing time of reversi- ble homogene...
AbstractFor Lp convergence rates of a time homogeneous Markov process, sufficient conditions are giv...
Consider the partial sums {St} of a real-valued functional F(Φ(t)) of a Markov chain {Φ(0)} with val...
grantor: University of TorontoQuantitative geometric rates of convergence for reversible M...
Convergence rates of Markov chains have been widely studied in recent years. In particu-lar, quantit...
For Lp convergence rates of a time homogeneous Markov process, sufficient conditions are given in te...
AbstractA necessary and sufficient condition for a finite ergodic homogeneous Markov chain to conver...
International audienceThis book concerns discrete-time homogeneous Markov chains that admit an invar...
We study the spectral theory of a reversible Markov chain associated to a hypoelliptic random walk o...
Bounds on convergence rates for Markov chains are a very widely-studied topic, motivated largely by ...
Summary. Bounds on convergence rates for Markov chains are a very widely-studied topic, motivated la...
AbstractWe consider the problem of giving explicit spectral bounds for time inhomogeneous Markov cha...
We continue the work of improving the rate of convergence of ergodic homogeneous Markov chains. The ...
AbstractFor finite Markov chains the eigenvalues of P can be used to characterize the chain and also...
An approach is proposed to the construction of general lower bounds for the rate of convergence of p...
In this thesis, we deal with the upper and lower bounds for the mixing time of reversi- ble homogene...
AbstractFor Lp convergence rates of a time homogeneous Markov process, sufficient conditions are giv...
Consider the partial sums {St} of a real-valued functional F(Φ(t)) of a Markov chain {Φ(0)} with val...
grantor: University of TorontoQuantitative geometric rates of convergence for reversible M...
Convergence rates of Markov chains have been widely studied in recent years. In particu-lar, quantit...
For Lp convergence rates of a time homogeneous Markov process, sufficient conditions are given in te...
AbstractA necessary and sufficient condition for a finite ergodic homogeneous Markov chain to conver...
International audienceThis book concerns discrete-time homogeneous Markov chains that admit an invar...
We study the spectral theory of a reversible Markov chain associated to a hypoelliptic random walk o...
Bounds on convergence rates for Markov chains are a very widely-studied topic, motivated largely by ...
Summary. Bounds on convergence rates for Markov chains are a very widely-studied topic, motivated la...