Moment estimates for convex measures
Abstract
Let p≥ 1, >0, r≥ (1+) p, and X be a (-1/r)-concave random vector in n with Euclidean norm |X|. We prove that ( |X|p)1/p≤ c (C() |X|+σp(X)), where σp(X)=|z|≤ 1(|<z,X>|p)1/p, C() depends only on and c is a universal constant. Moreover, if in addition X is centered then ( |X|-p)-1/p≥ c() (|X| - C σp(X)).
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