Wavelets and singular integrals on curves and surfaces

Author(s)

Bibliographic Information

Wavelets and singular integrals on curves and surfaces

Guy David

(Lecture notes in mathematics, 1465 . Nankai Institute of Mathematics, Tianjin, P.R. China ; v. 8)

Springer-Verlag, 1992

1st ed., 2nd, corrected printing

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  • : us

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Note

Bibliographical references: p. [100]-107

Includes index

Description and Table of Contents

Description

Wavelets are a recently developed tool for the analysis and synthesis of functions; their simplicity, versatility and precision makes them valuable in many branches of applied mathematics. The book begins with an introduction to the theory of wavelets and limits itself to the detailed construction of various orthonormal bases of wavelets. A second part centers on a criterion for the L2-boundedness of singular integral operators: the T(b)-theorem. It contains a full proof of that theorem. It contains a full proof of that theorem, and a few of the most striking applications (mostly to the Cauchy integral). The third part is a survey of recent attempts to understand the geometry of subsets of Rn on which analogues of the Cauchy kernel define bounded operators. The book was conceived for a graduate student, or researcher, with a primary interest in analysis (and preferably some knowledge of harmonic analysis and seeking an understanding of some of the new "real-variable methods" used in harmonic analysis.

Table of Contents

Wavelets.- Singular integral operators.- Singular integrals on curves and surfaces.

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