An improved uncertainty principle for functions with symmetry

July 19, 2018 Β· Declared Dead Β· + Add venue

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Authors Stephan Ramon Garcia, Gizem Karaali, Daniel J. Katz arXiv ID 1807.07648 Category math.CA Cross-listed cs.IT, math.NT Citations 8 Last Checked 3 months ago
Abstract
ChebotarΓ«v proved that every minor of a discrete Fourier matrix of prime order is nonzero. We prove a generalization of this result that includes analogues for discrete cosine and discrete sine matrices as special cases. We establish these results via a generalization of the BirΓ³-Meshulam-Tao uncertainty principle to functions with symmetries that arise from certain group actions, with some of the simplest examples being even and odd functions. We show that our result is best possible and in some cases is stronger than that of BirΓ³-Meshulam-Tao. Some of these results hold in certain circumstances for non-prime fields; Gauss sums play a central role in such investigations.
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