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Improving Beckner's bound via Hermite functions

arXiv:1606.08500 · doi:10.2140/apde.2017.10.929

Abstract

We obtain an improvement of the Beckner's inequality $\| f\|^{2}_{2} -\|f\|^{2}_{p} \leq (2-p) \| \nabla f\|_{2}^{2}$ valid for $p \in [1,2]$ and the Gaussian measure. Our improvement is essential for the intermediate case $p \in (1,2)$, and moreover, we find the natural extension of the inequality for any real $p$.

We have extended the result to any real power p