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Birkhäuser - Birkhäuser Mathematics | Harmonic and Geometric Analysis

Harmonic and Geometric Analysis

Citti, G., Grafakos, L., Pérez, C., Sarti, A., Zhong, X.

2014, X, 169 p.

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  • About this textbook

  • Contains two surveys of new results on linear and multilinear analysis
  • Offers a very nice presentation of the De Giorgi–Moser–Nash result
  • Contains elegant applications of harmonic analysis to human vision

Harmonic analysis, understood in a broad sense, has a very wide interplay with partial differential equations and in particular with the theory of quasiconformal mappings and its applications. Some areas in which real analysis has been extremely influential are PDE's and geometric analysis. Their foundations and subsequent developments made extensive use of the Calderón–Zygmund theory, especially the Lp inequalities for Calderón–Zygmund operators (Beurling transform and Riesz transform, among others) and the theory of Muckenhoupt weights. 

This book presents an expanded version of four series of lectures delivered by the authors at the CRM in the spring of 2009. The first is an application of harmonic analysis and the Heisenberg group to understanding human vision, while the second and third series of lectures cover some of the main topics on linear and multilinear harmonic analysis. The last serves as a comprehensive introduction to a deep result from De Giorgi, Moser and Nash on the regularity of elliptic partial differential equations in divergence form.

Content Level » Graduate

Keywords » Heisenberg group - maximal function - multilinear Calderón-Zygmund operator - weights

Related subjects » Birkhäuser Mathematics

Table of contents 

1 Models of the Visual Cortex in Lie Groups.- 2 Multilinear Calderón–Zygmund Singular Integrals.- 3 Singular Integrals and Weights.- 4 De Giorgi–Nash–Moser Theory.

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