Convergence rate in the law of logarithm for negatively dependent random variables under sub-linear expectations

Abstract

Let \X,Xn,n 1\ be a sequence of identically distributed, negatively dependent (NA) random variables under sub-linear expectations, and denote Sn=Σi=1nXi, n 1. Assume that h(·) is a positive non-decreasing function on (0,∞) fulfulling ∫1∞(th(t))-1 t=∞. Write Lt= \,t\, (t)=∫1t(sh(s))-1 s, t 1. In this sequel, we establish that Σn=1∞(nh(n))-1\|Sn| (1+)σ2nL(n)\<∞, ∀ >0 if (X)=(-X)=0 and (X2)=σ2∈ (0,∞). The result generalizes that of NA random variables in probability space.