Self-normalized moderate deviation and laws of the iterated logarithm under G-expectation

Abstract

The sub-linear expectation or called G-expectation is a nonlinear expectation having advantage of modeling non-additive probability problems and the volatility uncertainty in finance. Let \Xn;n 1\ be a sequence of independent random variables in a sub-linear expectation space (, H, E). Denote Sn=Σk=1n Xk and Vn2=Σk=1n Xk2. In this paper, a moderate deviation for self-normalized sums, that is, the asymptotic capacity of the event \Sn/Vn xn \ for xn=o(n), is found both for identically distributed random variables and independent but not necessarily identically distributed random variables. As an applications, the self-normalized laws of the iterated logarithm are obtained.