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This third volume of Analysis in Banach Spaces offers a systematic treatment of Banach space-valued singular integrals, Fourier transforms, and function spaces. It further develops and ramifies the theory of functional calculus from Volume II and describes applications of these new notions and tools to the problem of maximal regularity of evolution equations. The exposition provides a unified treatment of a large body of results, much of which has previously only been available in the form of research papers. Some of the more classical topics are presented in a novel way using modern techniques amenable to a vector-valued treatment. Thanks to its accessible style with complete and detailed proofs, this book will be an invaluable reference for researchers interested in functional analysis, harmonic analysis, and the operator-theoretic approach to deterministic and stochastic evolution equations.
Inhaltsverzeichnis
11 Singular integral operators.- 12 Dyadic operators and the T (1) theorem.- 13 The Fourier transform and multipliers.- 14 Function spaces.- 15 Bounded imaginary powers.- 16 The H -functional calculus revisited.- 17 Maximal regularity.- 18 Nonlinear parabolic evolution equations in critical spaces.- Appendix Q: Questions.- Appendix K: Semigroup theory revisited.- Appendix L: The trace method for real interpolation theory.
Bericht
The authors thus select a representative set of topics, and present each of them in the thorough and highly readable style . Anyone primarily trained in functional analysis is extremely likely to enjoy the Analysis in Banach spaces series. For these readers, the series provides a highly readable and completely self-contained entry point into many other Fields, especially harmonic and stochastic analysis. (Pierre Portal, Mathematical Reviews, January, 2025)
The authors always cover the necessary prerequisites from earlier developments and the book is meant to be self-contained. ... The volume ends with an interesting list of open problems and an appendix containing a section on measurable semigroups and another one on the trace method for real interpolation. (Oscar Blasco, zbMATH 1534.46003, 2024)
