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Error bounds of MCMC for functions with unbounded stationary variance

We prove explicit error bounds for Markov chain Monte Carlo (MCMC) methods to compute expectations of functions with unbounded stationary variance. We assume that there is a $p\in(1,2)$ so that the functions have finite $L_p$-norm. For uniformly ergodic Markov chains we obtain error bounds with the optimal order of convergence $n^{1/p-1}$ and if there exists a spectral gap we almost get the optimal order. Further, a burn-in period is taken into account and a recipe for choosing the burn-in is provided.

preprint2015arXivOpen access
Daniel RudolfNikolaus Schweizer
math.PRmath.STmath.NAStatistics Theory
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Daniel RudolfNikolaus Schweizer

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