Some results on two-sided LIL behavior
Abstract
Let X,Xn;n≥ 1 be a sequence of i.i.d. mean-zero random variables, and let Sn=Σi=1nXi,n≥ 1. We establish necessary and sufficient conditions for having with probability 1, 0<lim supn ∞|Sn|/(n)<∞, where h is from a suitable subclass of the positive, nondecreasing slowly varying functions. Specializing our result to h(n)=( n)p, where p>1 and to h(n)=( n)r, r>0, we obtain analogues of the Hartman-Wintner LIL in the infinite variance case. Our proof is based on a general result dealing with LIL behavior of the normalized sums Sn/cn;n 1, where cn is a sufficiently regular normalizing sequence.
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