Self-normalized Cram\'er type moderate deviations for stationary sequences and applications

Abstract

Let (X i)i≥1 be a stationary sequence. Denote m= nα , 0< α < 1, and k= n/m , where a stands for the integer part of a. Set Sj = Σi=1m Xm(j-1)+i, 1≤ j ≤ k, and (Vk)2 = Σj=1k (Sj)2. We prove a Cram\'er type moderate deviation expansion for P( Σj=1k Sj /Vk ≥ x) as n ∞. Applications to mixing type sequences, contracting Markov chains, expanding maps and confidence intervals are discussed.