A refined version of the integro-local Stone theorem
Abstract
Let X, X1, X2,… be a sequence of non-lattice i.i.d. random variables with E X=0, E X=1, and let Sn:= X1+ ·s+ Xn, n 1. We refine Stone's integro-local theorem by deriving the first term in the asymptotic expansion for the probability P (Sn∈ [x,x+)) with x∈ R, >0, as n∞ and establishing uniform bounds for the remainder term, under the assumption that the distribution of X satisfies Cram\'er's strong non-lattice condition and E |X|r<∞ for some r 3.
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