Jianya Lu, Wei Biao Wu, Zhijie Xiao, Lihu Xu
Published 2022-09-26Version 1
Inspired by \citet{Berkes14} and \citet{Wu07}, we prove an almost sure invariance principle for stationary $\beta-$mixing stochastic processes defined on Hilbert space. Our result can be applied to Markov chain satisfying Meyn-Tweedie type Lyapunov condition and thus generalises the contraction condition in \citet[Example 2.2]{Berkes14}. We prove our main theorem by the big and small blocks technique and an embedding result in \citet{gotze2011estimates}. Our result is further applied to the ergodic Markov chain and functional autoregressive processes.
Time regularity of Lévy-type evolution in Hilbert spaces and of some $α$-stable processes
An almost sure invariance principle for some classes of inhomogeneous Markov chains and non-stationary $ρ$-mixing sequences
An Almost Sure Invariance Principle for Additive Functionals of Markov Chains
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