Hardy Spaces on the Euclidean Space

Akihito Uchiyama (Autor)

Buch | Hardcover

305 Seiten

2001
Springer Verlag, Japan
978-4-431-70319-8 (ISBN)

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"Still waters run deep." This proverb expresses exactly how a mathematician Akihito Uchiyama and his works were. He was not celebrated except in the field of harmonic analysis, and indeed he never wanted that. He suddenly passed away in summer of 1997 at the age of 48. However, nowadays his contributions to the fields of harmonic analysis and real analysis are permeating through various fields of analysis deep and wide. One could write several papers explaining his contributions and how they have been absorbed into these fields, developed, and used in further breakthroughs. Peter W. Jones (Professor of Yale University) says in his special contribution to this book that Uchiyama's decomposition of BMO functions is considered to be the Mount Everest of Hardy space theory. This book is based on the draft, which the author Akihito Uchiyama had completed by 1990. It deals with the theory of real Hardy spaces on the n-dimensional Euclidean space. Here the author explains scrupulously some of important results on Hardy spaces by real-variable methods, in particular, the atomic decomposition of elements in Hardy spaces and his constructive proof of the Fefferman-Stein decomposition of BMO functions into the sum of a bounded?function and Riesz transforms of bounded functions.

0. Introduction.- 1. Lipschitz spaces and BMO.- 2. Atomic Hp spaces.- 3. Operators on Hp.- 4. Atomic decomposition from grand maximal functions.- 5. Atomic decomposition from S functions.- 6. Hardy-Littlewood-Fefferman-Stein type inequalities, 1.- 7. Hardy-Littlewood-Fefferman-Stein type inequalities, 2.- 8*Hardy-Littlewood-Fefferman-Stein type inequalities, 3.- 9. Grand maximal functions from radial maximal functions.- 10* S-functions from g-functions.- 11. Good ? inequalities for nontangential maximal functions and S-functions of harmonic functions.- 14. Subharmonicity, 1.- 15. Subharmonicity, 2.- 16. Preliminaries for characterizations of Hp in terms of Fourier multipliers.- 17. Characterization of Hp in terms of Riesz transforms.- 18. Other results on the characterization of Hp in terms of Fourier multipliers.- 19. Fefferman’s original proof of.- 20. Varopoulos’s proof of the above inequality.- 21. The Fefferman-Stein decomposition of BMO.- 22. A constructive proof of the Fefferman-Stein decomposition of BMO.- 23. Vector-valued unimodular BMO functions.- 24. Extension of the Fefferman-Stein decomposition of BMO, 1.- 25. Characterization of H1 in terms of Fourier multipliers.- 26. Extension of the Fefferman-Stein decomposition of BMO, 2.- 27. Characterization of Hp in terms of Fourier multipliers.- 28. The one-dimensional case.- References.

Erscheint lt. Verlag	1.7.2001
Reihe/Serie	Springer Monographs in Mathematics
Zusatzinfo	XIII, 305 p.
Verlagsort	Tokyo
Sprache	englisch
Maße	155 x 235 mm
Themenwelt	Mathematik / Informatik ► Mathematik ► Analysis
	Mathematik / Informatik ► Mathematik ► Arithmetik / Zahlentheorie
	Mathematik / Informatik ► Mathematik ► Geometrie / Topologie
	Mathematik / Informatik ► Mathematik ► Wahrscheinlichkeit / Kombinatorik
ISBN-10	4-431-70319-5 / 4431703195
ISBN-13	978-4-431-70319-8 / 9784431703198
Zustand	Neuware