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Main Author: Eckstein, Stephan
Format: Preprint
Published: 2017
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Online Access:https://arxiv.org/abs/1709.02278
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author Eckstein, Stephan
author_facet Eckstein, Stephan
contents We consider discrete time Markov chains with Polish state space. The large deviations principle for empirical measures of a Markov chain can equivalently be stated in Laplace principle form, which builds on the convex dual pair of relative entropy (or Kullback-Leibler divergence) and cumulant generating functional $f\mapsto \ln \int \exp(f)$. Following the approach by Lacker in the i.i.d. case, we generalize the Laplace principle to a greater class of convex dual pairs. We present in depth one application arising from this extension, which includes large deviations results and a weak law of large numbers for certain robust Markov chains - similar to Markov set chains - where we model robustness via the first Wasserstein distance. The setting and proof of the extended Laplace principle are based on the weak convergence approach to large deviations by Dupuis and Ellis.
format Preprint
id arxiv_https___arxiv_org_abs_1709_02278
institution arXiv
publishDate 2017
record_format arxiv
spellingShingle Extended Laplace Principle for Empirical Measures of a Markov Chain
Eckstein, Stephan
Probability
60F10, 60J05
We consider discrete time Markov chains with Polish state space. The large deviations principle for empirical measures of a Markov chain can equivalently be stated in Laplace principle form, which builds on the convex dual pair of relative entropy (or Kullback-Leibler divergence) and cumulant generating functional $f\mapsto \ln \int \exp(f)$. Following the approach by Lacker in the i.i.d. case, we generalize the Laplace principle to a greater class of convex dual pairs. We present in depth one application arising from this extension, which includes large deviations results and a weak law of large numbers for certain robust Markov chains - similar to Markov set chains - where we model robustness via the first Wasserstein distance. The setting and proof of the extended Laplace principle are based on the weak convergence approach to large deviations by Dupuis and Ellis.
title Extended Laplace Principle for Empirical Measures of a Markov Chain
topic Probability
60F10, 60J05
url https://arxiv.org/abs/1709.02278