A Berry-Esseen theorem and Edgeworth expansions for uniformly elliptic inhomogeneous Markov chains

Abstract

We prove a Berry-Esseen theorem and Edgeworth expansions for partial sums of the form SN=Σn=1Nfn(Xn,Xn+1), where \Xn\ is a uniformly elliptic inhomogeneous Markov chain and \fn\ is a sequence of uniformly bounded functions. The Berry-Esseen theorem holds without additional assumptions, while expansions of order 1 hold when \fn\ is irreducible, which is an optimal condition. For higher order expansions, we then focus on two situations. The first is when the essential supremum of fn is of order O(n-) for some ∈(0,1/2). In this case it turns out that expansions of any order r<11-2 hold, and this condition is optimal. The second case is uniformly elliptic chains on a compact Riemannian manifold. When fn are uniformly Lipschitz continuous we show that SN admits expansions of all orders. When fn are uniformly H\"older continuous with some exponent ∈(0,1), we show that SN admits expansions of all orders r<1+1-. For H\"older continues functions with <1 our results are new also for uniformly elliptic homogeneous Markov chains and a single functional f=fn. In fact, we show that the condition r<1+1- is optimal even in the homogeneous case.