Abstract
ABSTRACTLet {Xnk, k ⩾ 1, n ⩾ 1} be an array of rowwise asymptotically almost negatively associated random variables and {an, n ⩾ 1} be a sequence of positive real numbers such that an↑∞. Under some suitable conditions, Lr convergence of is studied. The results obtained in the paper generalize and improve some corresponding ones for negatively associated random variables and independent random variables.
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