Cram\'er type moderate deviations for self-normalized -mixing sequences

Abstract

Let (ηi)i≥1 be a sequence of -mixing random variables. Let m= nα , 0< α < 1, k= n/(2m) , and Yj = Σi=1m ηm(j-1)+i, 1≤ j ≤ k. Set Sko=Σj=1k Yj and [So]k=Σi=1k (Yj )2. We prove a Cram\'er type moderate deviation expansion for P(Sko/[ So]k ≥ x) as n ∞. Our result is similar to the recent work of Chen et al.\ [Self-normalized Cram\'er-type moderate deviations under dependence. Ann.\ Statist.\ 2016; 44(4): 1593--1617] where the authors established Cram\'er type moderate deviation expansions for β-mixing sequences. Comparing to the result of Chen et al., our results hold for mixing coefficients with polynomial decaying rate and wider ranges of validity.