On a multidimensional spherically invariant extension of the Rademacher--Gaussian comparison

Abstract

It is shown that equation* P(\|a1U1+…+anUn\|>u) c\,P(a\|Zd\|>u) equation* for all real u, where U1,…,Un are independent random vectors uniformly distributed on the unit sphere in Rd, a1,…,an are any real numbers, a:=(a12+…+an2)/d, Zd is a standard normal random vector in Rd, and c=2e3/9=4.46…. This constant factor is about 89 times as small as the one in a recent result by Nayar and Tkocz, who proved, by a different method, a corresponding conjecture by Oleszkiewicz. As an immediate application, a corresponding upper bound on the tail probabilities for the norm of the sum of arbitrary independent spherically invariant random vectors is given.