Self-normalized Cram\'er type moderate deviations for the maximum of sums
Abstract
Let X1,X2,... be independent random variables with zero means and finite variances, and let Sn=Σi=1nXi and V2n=Σi=1nX2i. A Cram\'er type moderate deviation for the maximum of the self-normalized sums 1≤ k≤ nSk/Vn is obtained. In particular, for identically distributed X1,X2,..., it is proved that P(1≤ k≤ nSk≥ xVn)/(1- (x))→2 uniformly for 0<x≤o(n1/6) under the optimal finite third moment of X1.
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