Continuation of Convergence for Distribution Functions of Sums of Weakly Dependent Random Variables

## I. fntFoduction Let {X,,, n 2 1) be a sequence of independent random variables, P, and f, the distribution function and the characteristic fundion of the X,, respectively. Let us put SN = 2 X,, where N is a pasitive integer-valued random variable independent of X,, ?t 2 1. Furthermore, let { P,

Let [X n , n 1] be a sequence of stationary negatively associated random variables, Under some suitable conditions, the central limit theorem and the weak convergence for sums are investigated. Applications to limiting distributions of estimators of Var S n are also discussed.

We consider sequences of length m of n-tuples each with k nonzero entries chosen randomly from an Abelian group or finite field. For what values of m does there exist a subsequence which is zero-sum or linearly dependent, respectively? We report some results relating to these problems.