Moritz Egert Robert Haller Sylvie Monniaux Patrick Tolksdorf Egert Harmonic Analysis Techniques for Elliptic Operators

Harmonic Analysis Techniques for Elliptic Operators

von Moritz Egert Robert Haller Sylvie Monniaux Patrick Tolksdorf

Lecture Notes of the 27th Internet Seminar on Evolution Equations

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Beschreibung

The study of the Laplacian through the Fourier transform lies at the center of classical harmonic analysis. It is Plancherel’s theorem that intimately links square-integrable functions with the theory of weak derivatives and a symbolic calculus for the Laplacian. Examples include Littlewood–Paley inequalities, Riesz transform estimates and Calderón–Zygmund extrapolation. Over the last decades, the quest to generalize these properties to elliptic operators L in divergence form with bounded measurable coefficients has triggered the development of new techniques that led to a surge of spectacular results in elliptic and parabolic PDE theory.

Assuming only undergraduate knowledge in analysis and some background on Hilbert spaces and the Fourier transform, the authors develop the cornerstones of this ‘L-adapted Fourier analysis’ over 14 consecutive lectures. As they delve deeper into the topic, readers make first encounters with maximal functions, Carleson measures and a T(b) theorem. The lectures culminate in a self-contained presentation of the solution to the Kato conjecture, a challenging problem that resisted solution for 40 years until it was finally solved in 2001.

This book can serve as a fully developed curriculum for a first graduate course in harmonic analysis and PDEs. Based on the 27th Internet Seminar on Evolution Equations, organized by the authors in the 2023/24 academic year, each lecture is enriched with original exercises, detailed solutions, and video presentations guiding through each theorem’s proof and offering additional insights.


The study of the Laplacian through the Fourier transform lies at the center of classical harmonic analysis. It is Plancherel’s theorem that intimately links square-integrable functions with the theory of weak derivatives and a symbolic calculus for the Laplacian. Examples include Littlewood–Paley inequalities, Riesz transform estimates and Calderón–Zygmund extrapolation. Over the last decades, the quest to generalize these properties to elliptic operators L in divergence form with bounded measurable coefficients has triggered the development of new techniques that led to a surge of spectacular results in elliptic and parabolic PDE theory.

Assuming only undergraduate knowledge in analysis and some background on Hilbert spaces and the Fourier transform, the authors develop the cornerstones of this ‘L-adapted Fourier analysis’ over 14 consecutive lectures. As they delve deeper into the topic, readers make first encounters with maximal functions, Carleson measures and a T(b) theorem. The lectures culminate in a self-contained presentation of the solution to the Kato conjecture, a challenging problem that resisted solution for 40 years until it was finally solved in 2001.

This book can serve as a fully developed curriculum for a first graduate course in harmonic analysis and PDEs. Based on the 27th Internet Seminar on Evolution Equations, organized by the authors in the 2023/24 academic year, each lecture is enriched with original exercises, detailed solutions, and video presentations guiding through each theorem’s proof and offering additional insights.


Presents all material required to understand the solution of the famous Kato conjecture Includes lecture videos presenting the proofs to theorems and providing further insight Contains original exercises and comprehensive solutions enriching each lecture

Autor*in

Moritz Egert

Themen in »Harmonic Analysis Techniques for Elliptic Operators«

Harmonic Analysis Elliptic Operators Kato Square Root Problem Functional Calculus Divergence Form Operators Square Function Estimates Off-diagonal Estimates Quadratic Estimates Carleson Measures T(b) Theorem Kato Conjecture Square Root Property Fractional Powers Fractional Sobolev Spaces Maximal Functions

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Details

ISBN: 9783032130143
Verlag: Springer International Publishing
Erscheinung: 13.09.2026

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