The norm of the Fourier transform on compact or discrete abelian groups

November 15, 2016 Β· Declared Dead Β· πŸ› Journal of Fourier Analysis and Applications

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Authors Mokshay Madiman, Peng Xu arXiv ID 1611.04692 Category math.CA Cross-listed cs.IT Citations 1 Venue Journal of Fourier Analysis and Applications Last Checked 3 months ago
Abstract
We calculate the norm of the Fourier operator from $L^p(X)$ to $L^q(\hat{X})$ when $X$ is an infinite locally compact abelian group that is, furthermore, compact or discrete. This subsumes the sharp Hausdorff-Young inequality on such groups. In particular, we identify the region in $(p,q)$-space where the norm is infinite, generalizing a result of Fournier, and setting up a contrast with the case of finite abelian groups, where the norm was determined by Gilbert and Rzeszotnik. As an application, uncertainty principles on such groups expressed in terms of RΓ©nyi entropies are discussed.
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