Estimates of stability with respect to the number of summands for distributions of successive sums of independent identically distributed vectors
Abstract
Let X1,…, Xn,… be i.i.d.\ d-dimensional random vectors with common distribution F. Then Sn = X1+…+Xn has distribution Fn (degree is understood in the sense of convolution). Let Cd(F,G) = A |F\A\ - G\A\|, where the supremum is taken over all convex subsets of Rd. Basic result is as follows. For any nontrivial distribution F there is c1(F) such that Cd(Fn, Fn+1)≤ c1(F) n for any natural n. The distribution F is called trivial if it is concentrated on a hyperplane that does not contain the origin. Clearly, for such F Cd(Fn, Fn+1) = 1. A similar result for the Prokhorov distance is also obtained. For any d-dimensional distribution~F there is a c2(F)>0 that depends only on F and such that multline (Fn)\A\ (Fn+1)\Ac2(F)\+c2(F)n and (Fn+1)\A\≤ (Fn)\Ac2(F)\+c2(F) n multline for any Borel set A for all positive integers n. Here A is -neighborhood of the set A .
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