Norms of weighted sums of log-concave random vectors
Abstract
Let C and K be centrally symmetric convex bodies of volume 1 in Rn. We provide upper bounds for the multi-integral expression equation*\| t\|Cs,K=∫C·s∫C\|Σj=1stjxj\|K\,dx1·s dxsequation* in the case where C is isotropic. Our approach provides an alternative proof of the sharp lower bound, due to Gluskin and V. Milman, for this quantity. We also present some applications to "randomized" vector balancing problems.
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