Weak convergence of self-normalized partial sums processes
Abstract
Let \X, Xn, n≥ 1\ be a sequence of independent identically distributed non-degenerate random variables. Put S0=0, Sn = Σni=1 Xi and Vn2=Σni=1 Xi2, n 1. A weak convergence theorem is established for the self-normalized partial sums processes \S[nt]/Vn, 0 t 1\ when X belongs to the domain of attraction of a stable law with index α ∈ (0,2]. The respective limiting distributions of the random variables 1 i n|Xi|/Sn and 1 i n|Xi|/Vn are also obtained under the same condition.
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