Subgaussianity is hereditarily determined
Abstract
Let n be a positive integer, let X=(X1,…,Xn) be a random vector in Rn with bounded entries, and let (θ1,…,θn) be a vector in Rn. We show that the subgaussian behavior of the random variable θ1 X1+… +θn Xn is essentially determined by the subgaussian behavior of the random variables Σi∈ H θi Xi where H is a random subset of \1,…,n\.
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