Sharp constants relating the sub-Gaussian norm and the sub-Gaussian parameter
Abstract
We determine the optimal constants in the classical inequalities relating the sub-Gaussian norm \(\|X\|_2\) and the sub-Gaussian parameter \(σX\) for centered real-valued random variables. We show that \(3/8 · \|X\|_2 σX 2 · \|X\|_2\), and that both bounds are sharp, attained by the standard Gaussian and Rademacher distributions, respectively.
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