Moment bounds for dependent sequences in smooth Banach spaces
Abstract
We prove a Marcinkiewicz-Zygmund type inequality for random variables taking values in a smooth Banach space. Next, we obtain some sharp concentration inequalities for the empirical measure of \T, T2, ·s, Tn\, on a class of smooth functions, when T belongs to a class of nonuniformly expanding maps of the unit interval.
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