Concentration inequalities for Markov processes via coupling
Abstract
We obtain moment and Gaussian bounds for general Lipschitz functions evaluated along the sample path of a Markov chain. We treat Markov chains on general (possibly unbounded) state spaces via a coupling method. If the first moment of the coupling time exists, then we obtain a variance inequality. If a moment of order 1+epsilon of the coupling time exists, then depending on the behavior of the stationary distribution, we obtain higher moment bounds. This immediately implies polynomial concentration inequalities. In the case that a moment of order 1+epsilon is finite uniformly in the starting point of the coupling, we obtain a Gaussian bound. We illustrate the general results with house of cards processes, in which both uniform and non-uniform behavior of moments of the coupling time can occur.
Keywords
Cite
@article{arxiv.0810.0097,
title = {Concentration inequalities for Markov processes via coupling},
author = {J. -R. Chazottes and F. Redig},
journal= {arXiv preprint arXiv:0810.0097},
year = {2010}
}
Comments
Electron. J. Probab. (2009). A little mistake, indicated by A. Guillin, was corrected in Theorem 7.1, see Remark 7.1