Sharp One-Dimensional Sub-Gaussian Comparison in Convex Order
Abstract
We prove that any random variable X whose moment generating function is point-wise upper bounded by that of G N(0,1) must be dominated by G/E[|G|] in convex order, meaning E[f(X)] E[f(G/E[|G|])] for all convex f. This is sharp as witnessed by X Unif(\-1,1\) and f(x) = |x| .
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