On the functional limits for partial sums under stable law

Abstract

For the partial sums (Sn) of independent random variables we define a stochastic process sn(t):=(1/dn)Σk [nt] (Sk/k-μ) and prove that (1/ N)Σn N(1/n) I\sn(t) x\ Gt(x) a.s. if and only if (1/ N)Σn N (1/n)P(sn(t) x) Gt(x), for some sequence (dn) and distribution Gt. We also prove an almost sure functional limit theorem for the product of partial sums of i.i.d. positive random variables attracted to an α-stable law with α∈ (1,2].