Exact lower and upper bounds for shifts of Gaussian measures

Abstract

Exact upper and lower bounds on the ratio Ew(X-v)/Ew(X) for a centered Gaussian random vector X in Rn, as well as bounds on the rate of change of Ew(X-tv) in t, where wn[0,∞) is any even unimodal function and v is any vector in Rn. As a corollary of such results, exact upper and lower bounds on the power function of statistical tests for the mean of a multivariate normal distribution are given.

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