Some Results on the Central Limit Theorem for Subsequences in Banach Spaces

Abstract

Let \X, Xn; n ≥ 1 \ be a sequence of i.i.d. B-valued random variables and set Sn = Σi=1nXi,~n ≥ 1. This note is devoted to study the classical central limitr theorem for subsequences of sums of i.i.d. B-valued random variables. We show that, under the assumption that B is of cotype 2 space, (Snn )n ≥ 1 converges weakly if and only if (Smnmn )n ≥ 1 converges weakly for a subsequence \mn; ~n ≥ 1\ of positive integers. We conjecture that this result is false if B is not of cotype 2 space. In addition, we show that, if (Smnmn )n ≥ 1 converges weakly for a subsequence \mn; ~n ≥ 1\ of positive integers. and (Snn )n ≥ 1 does not converge weakly, then (Sn/an )n ≥ 1 does not converge weakly to a non-degenerate probability measure for any sequence \an; n ≥ 1 \ of positive real numbers.