Ilona Iglewska-Nowak
Published 2018-06-20Version 1
The uncertainty product of a function is a quantity that measures the trade-off between the space and the frequency localization of the function. Its boundedness from below is the content of various uncertainty principles. In the present paper, functions over the $n$-dimensional sphere are considered. A formula is derived that expresses the uncertainty product of a continuous function in terms of its Fourier coefficients. It is applied to a directional derivative of a zonal wavelet, and the behavior of the uncertainty product of this function is discussed.
Uncertainty product of the spherical Gauss-Weierstrass wavelet
A continuous spherical wavelet transform for~$\mathcal C(\mathcal S^n)$
Spherical Functions Associated With the Three Dimensional Sphere
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