arXiv:1112.0648 Abstract | arXiv Analytics

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On spherical expansions of smooth $\gr{SU}{n}$-zonal functions on the unit sphere in $\NC^n$

Published 2011-12-03Version 1

We give a self-contained presentation of a novel approach to a construction of spherical harmonic expansions on the unit sphere in $\NC^n$. We derive a new formula for coefficients of the expansion of a smooth zonal function defined on the unit sphere and apply it in some special cases. The expansion for the Poisson--Szeg\"o kernel for the unit ball in $\NC^n$ obtained by our method coincides with the result obtained originally by G. Folland, and on the other hand disproves results recently presented in a paper of V.A. Menegatto et al..

Comments: 12 pages

Categories: math.CA

Subjects: 58G35, 35F05, 33A75, 33A45

Keywords: unit sphere, spherical expansions, hand disproves results, method coincides, unit ball

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arXiv:1112.0648 [math.CA]Abstract References Reviews Resources

On spherical expansions of smooth $\gr{SU}{n}$-zonal functions on the unit sphere in $\NC^n$

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On spherical expansions of smooth $\gr{SU}{n}$-zonal functions on the unit sphere in $\NC^n$

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arXiv:1112.0648 [math.CA]Abstract References Reviews Resources