Uniform asymptotic normality of weighted sums of short-memory linear processes
Abstract
Let X1, X2,… be a short-memory linear process of random variables. For 1≤ q<2, let be a bounded set of real-valued functions on [0,1] with finite q-variation. It is proved that \n-1/2Σi=1nXif(i/n)\,f∈\ converges in outer distribution in the Banach space of bounded functions on as n∞. Several applications to a regression model and a multiple change point model are given.
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