Abstract
We build optimal exponential bounds for the probabilities of large deviations of sums ∑k=1nf(Xk) where (Xk) is a finite reversible Markov chain and f is an arbitrary bounded function. These bounds depend only on the stationary mean ${\mathbb {E}}_{\pi}f,$ the end-points of the support of f, the sample size n and the second largest eigenvalue λ of the transition matrix.
Citation
Carlos A. León. François Perron. "Optimal Hoeffding bounds for discrete reversible Markov chains." Ann. Appl. Probab. 14 (2) 958 - 970, May 2004. https://doi.org/10.1214/105051604000000170
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