Note on the complete moment convergence for moving average process of a class of random variables under sub-linear expectations

Abstract

In this paper, the complete moment convergence for the partial sums of moving average processes \Xn=Σi=-∞∞aiYi+n,n 1\ is proved under some proper conditions, where \Yi,-∞<i<∞\ is a doubly sequence of identically distributed, negatively dependent random variables under sub-linear expectations and \ai,-∞<i<∞\ is an absolutely summable sequence of real numbers. The results established in sub-linear expectation spaces generalize the corresponding ones in probability space.