arXiv:1910.02856 Abstract | arXiv Analytics

arXiv:1910.02856 [math.PR]Abstract References Reviews Resources

Combinatorial considerations on the invariant measure of a stochastic matrix

Published 2019-10-07Version 1

The invariant measure is a fundamental object in the theory of Markov processes. In finite dimensions a Markov process is defined by transition rates of the corresponding stochastic matrix. The Markov tree theorem provides an explicit representation of the invariant measure of a stochastic matrix. In this note, we given a simple and purely combinatorial proof of the Markov tree theorem. In the symmetric case of detailed balance, the statement and the proof simplifies even more.

Comments: 14 pages

Categories: math.PR

Subjects: 60Jxx

Keywords: invariant measure, stochastic matrix, combinatorial considerations, markov tree theorem, markov process

Related articles: Most relevant | Search more

arXiv:0902.0586 [math.PR] (Published 2009-02-03)

Heat Conduction Networks: Disposition of Heat Baths and Invariant Measure

Alain Camanes

arXiv:1703.10773 [math.PR] (Published 2017-03-31)

Invariant Measure for Quantum Trajectories

Tristan Benoist, Martin Fraas, Yan Pautrat, Clément Pellegrini

arXiv:2103.12942 [math.PR] (Published 2021-03-24)

On the long-time statistical behavior of smooth solutions of the weakly damped, stochastically-driven KdV equation

Nathan Glatt-Holtz, Vincent R. Martinez, Geordie H. Richards

arXiv Analytics

arXiv:1910.02856 [math.PR]Abstract References Reviews Resources

Combinatorial considerations on the invariant measure of a stochastic matrix

Links

Toolbox

arXiv:1910.02856 [math.PR]AbstractReferencesReviewsResources

Combinatorial considerations on the invariant measure of a stochastic matrix

Links

Toolbox

arXiv:1910.02856 [math.PR]Abstract References Reviews Resources