An Exact Upper Bound on the $L^p$ Lebesgue Constant and The $\infty$-R\'enyi Entropy Power Inequality for Integer Valued Random Variables

James Melbourne

An Exact Upper Bound on the Lp Lebesgue Constant and The ∞-R\'enyi Entropy Power Inequality for Integer Valued Random Variables

Abstract

In this paper, we proved an exact asymptotically sharp upper bound of the Lp Lebesgue Constant (i.e. the Lp norm of Dirichlet kernel) for p 2. As an application, we also verified the implication of a new ∞ -R\'enyi entropy power inequality for integer valued random variables.

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