On the rates of convergence for sums of dependent random variables

Abstract

For a sequence \Xn, \, n ≥slant 1 \ of nonnegative random variables where [(Xn - s,t),0], t > s ≥slant 0, satisfy a moment inequality, sufficient conditions are given under which Σk=1n (Xk - E \, Xk)/bn a.s. 0. Our statement allows us to obtain a strong law of large numbers for sequences of pairwise negatively quadrant dependent random variables under sharp normalising constants.