Fractal Spherical Harmonics | Zendy

M. A. Navascués | Zendy

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Fractal Spherical Harmonics

Author(s) -

M. A. Navascués

Publication year - 2013

Publication title -

international journal of analysis

Language(s) - English

Resource type - Journals

eISSN - 2314-4998

pISSN - 2314-498X

DOI - 10.1155/2013/927368

Subject(s) - mathematics , fractal , iterated function system , unit sphere , spherical harmonics , square integrable function , mathematical analysis , integrable system , bounded function , fuzzy sphere , fractal derivative , pure mathematics , fractal analysis , fractal dimension

This paper tackles the construction of fractal maps on the unit sphere. The functions defined are a generalization of the classical spherical harmonics. The methodology used involves an iterated function system and a linear and bounded operator of functions on the sphere. For a suitable choice of the coefficients of the system, one obtains classical maps on the sphere. The different values of the system parameters provide Bessel sequences, frames, and Riesz fractal bases for the Lebesgue space of the square integrable functions on the sphere. The Laplace series expansion is generalized to a sum in terms of the new fractal mappings

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