Master's Dissertation
DOI
https://doi.org/10.11606/D.55.2023.tde-08042024-105057
Document
Author
Full name
Isadora Zanato Leite
Institute/School/College
Knowledge Area
Date of Defense
Published
São Carlos, 2023
Supervisor
Committee
Jordão, Thaís (President)
Ebert, Marcelo Rempel
Picon, Tiago Henrique
Zani, Sergio Luis
Ebert, Marcelo Rempel
Picon, Tiago Henrique
Zani, Sergio Luis
Title in Portuguese
Análise harmônica sobre a esfera e aplicações
Keywords in Portuguese
Análise harmônica
Coeficientes de Fourier
Convoluções
Espaços zonais
Operador multiplicativo
Coeficientes de Fourier
Convoluções
Espaços zonais
Operador multiplicativo
Abstract in Portuguese
Neste trabalho, exploramos o espaço de medidas definidas sobre a esfera d-dimensional que são invariantes por rotações que deixam o polo da esfera fixo, chamado de espaço das medidas zonais. Relacionamos as funções zonais com o espaço das funções definidas no intervalo [-1,1]. Em seguida, introduzimos e relacionamos os conceitos de operador multiplicativo para funções integráveis e o de convolução com medidas zonais. A teoria de análise harmônica sobre a esfera desenvolvida é aplicada para estabelecer as séries de Fourier de funções integráveis e estudar a taxa de decaimento de sequências de autovalores de operadores integrais com núcleos suaves.
Title in English
Harmonic analysis on the sphere and applications
Keywords in English
Convolutions
Fourier coefficients
Harmonic analysis
Multiplier operator
Zonal spaces
Fourier coefficients
Harmonic analysis
Multiplier operator
Zonal spaces
Abstract in English
In this work, we explore the space of measures defined on the d-dimensional sphere that are invariant under all rotations leaving the pole of the sphere fixed, called the space of zonal measures. We relate the zonal functions spaces with the space of functions defined in the interval [-1,1]. Next, we introduce and relate the concepts of multiplicative operator for integrable functions and convolution with zonal measures. The theory of harmonic analysis on the sphere developed is applied to establish Fourier series of integrable functions and to study the decay rate of sequences of eigenvalues of integral operators with smooth kernels.
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Publishing Date
2024-04-08
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Digital Library of Theses and Dissertations of USP. Copyright © 2001-2024. All rights reserved.