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Compact Laws of the Iterated Logarithm for B-Valued Random Variables with Two-Dimensional Indices

Authors:	Deli Li R J Tomkins

Abstract:	Let $({\text{B,\|\|}} \cdot {\text{\|\|}})$ be a real separable Banach space and {X, X _{n, m}; (n, m) N ²} B-valued i.i.d. random variables. Set $S(n,m) = \sum\nolimits_{i = 1}^n {\sum\nolimits_{j = 1}^m {X_{i,j} ,(n,m) \in N} } ^2$ . In this paper, the compact law of the iterated logarithm, CLIL(D), for B-valued random variables with two-dimensional indices ranging over a subset D of N ² is studied. There is a gap between the moment conditions for CLIL(N ¹) and those for CLIL(N ²). The main result of this paper fills this gap by presenting necessary and sufficient conditions for the sequence ${{\{ S(n,m)} \mathord{\left/ {\vphantom {{\{ S(n,m)} {\sqrt {2nm\log \log (nm);} (n,m) \in }}} \right. \kern-\nulldelimiterspace} {\sqrt {2nm\log \log (nm);} (n,m) \in }}N^r ({\alpha , }\varphi {)\} }$ to be almost surely conditionally compact in B, where, for 0, 1 r 2, N ^r(, ) = {(n, m) N ²; n m n exp{(log n)^r–1 (n)}} and (·) is any positive, continuous, nondecreasing function such that (t)/(log log t) is eventually decreasing as t , for some > 0.

Keywords:	Banach space compact law of the iterated logarithm independent random variables two-dimensional indices
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