عنوان
پدید آورنده
موضوع
رده
QA331.5
QA331
.
5
کتابخانه
محل استقرار
INTERNATIONAL STANDARD BOOK NUMBER
(Number (ISBN
3030044297
(Number (ISBN
9783030044299
Erroneous ISBN
3030044289
Erroneous ISBN
9783030044282
TITLE AND STATEMENT OF RESPONSIBILITY
Title Proper
Functions of bounded variation and their Fourier transforms /
General Material Designation
[Book]
First Statement of Responsibility
Elijah Liflyand.
.PUBLICATION, DISTRIBUTION, ETC
Place of Publication, Distribution, etc.
Cham, Switzerland :
Name of Publisher, Distributor, etc.
Birkhäuser,
Date of Publication, Distribution, etc.
2019.
PHYSICAL DESCRIPTION
Specific Material Designation and Extent of Item
1 online resource (xxiv, 194 pages)
SERIES
Series Title
Applied and numerical harmonic analysis,
ISSN of Series
2296-5009
INTERNAL BIBLIOGRAPHIES/INDEXES NOTE
Text of Note
Includes bibliographical references and index.
CONTENTS NOTE
Text of Note
Intro; ANHA Series Preface; Contents; Foreword; Introduction; Transforms; Functions; Basic theorem; Advancement; Tools; Sharp versions; Multivariate case; Picture and details; Part I: One-dimensional Case; Chapter 1 A toolkit; 1.1 Functions of bounded variation; 1.2 Fourier transform; 1.3 Hilbert transform; 1.3.1 Fourier transform weakly generates Hilbert transform; 1.3.2 Existence almost everywhere; 1.3.3 Integrability of the Hilbert transform; 1.3.4 Special cases of the Hilbert transform; 1.3.5 Conditions for the integrability of the Hilbert transform; 1.4 Hardy spaces and subspaces
Text of Note
1.4.1 Atomic characterization1.4.2 Molecular characterization; 1.4.3 Integrability spaces; 1.4.4 A Paley-Wiener theorem; 1.5 Balance integral operator; Chapter 2 Functions with derivative in a Hardy space; 2.1 First steps; 2.2 Derivative in H1 o (R+); 2.3 Derivative in H1 e (R+); 2.4 Derivative in a subspace of H1 o (R+) or H1 e (R+); 2.5 Functions on the whole axis; 2.6 Absolute continuity, integrability of the Fourier transform and a Hardy-Littlewood theorem; Chapter 3 Integrability spaces: wide, wider and widest; 3.1 Widest integrability spaces; 3.2 The sine Fourier transform
Text of Note
3.3 Intermediate spaces3.3.1 Embeddings; 3.3.2 A counterexample; 3.3.3 Intermediate spaces between H1 0 and H1Q; 3.4 Fourier-Hardy type inequalities; Chapter 4 Sharper results; 4.1 The Fourier transform of a convex function; 4.1.1 General representation of the Fourier transform; 4.1.2 Convex functions; 4.2 Generalizations of Theorems 2.8 and 2.20; 4.3 The sine Fourier transform revisited; 4.4 A Szökefalvi-Nagy type theorem; Part II: Multi-dimensional Case; Chapter 5 A toolkit for several dimensions; 5.1 Indicator notation; 5.2 Multidimensional variations; 5.2.1 Vitali's and Hardy's variations
Text of Note
5.2.2 Tonelli's variation5.3 Fourier transform; 5.3.1 L1-theroy; 5.3.2 L2- and Lp-theory; 5.3.3 Poisson summation formula; 5.4 Multidimensional spaces; 5.5 Absolute continuity; 5.6 Integration by parts; Chapter 6 Integrability of the Fourier transforms; 6.1 Functions with derivatives in the Hardy type spaces; 6.2 Absolute continuity, integrability of the Fourier transform and a Hardy-Littlewood theorem; 6.2.1 Commutativity; 6.2.2 Conditions for absolute continuity; 6.2.3 Hardy-Littlewood type theorems; Chapter 7 Sharp results; 7.1 Convexity type results; 7.1.1 Functions of convex type
Text of Note
7.2 Equalities7.2.1 (Even) more general cases; 7.2.2 The most general situation; 7.3 Szökefalvi-Nagy type theorem; 7.3.1 Auxiliary results; 7.3.2 Proof of Theorem 7.17; Chapter 8 Bounded variation and sampling; 8.1 Bridge; 8.1.1 One-dimensional bridge; 8.1.2 Temporary bridge; 8.1.3 Stable bridge; 8.2 On the Poisson summation formula; 8.2.1 Background; 8.2.2 A version of the Poisson summation formula; 8.2.3 Concluding remarks and an example; Chapter 9 Multidimensional case: radial functions; 9.1 Fractional derivative and MV Classes; 9.2 Necessary conditions; 9.3 Radial extensions; Afterword
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SUMMARY OR ABSTRACT
Text of Note
Functions of bounded variation represent an important class of functions. Studying their Fourier transforms is a valuable means of revealing their analytic properties. Moreover, it brings to light new interrelations between these functions and the real Hardy space and, correspondingly, between the Fourier transform and the Hilbert transform. This book is divided into two major parts, the first of which addresses several aspects of the behavior of the Fourier transform of a function of bounded variation in dimension one. In turn, the second part examines the Fourier transforms of multivariate functions with bounded Hardy variation. The results obtained are subsequently applicable to problems in approximation theory, summability of the Fourier series and integrability of trigonometric series.
OTHER EDITION IN ANOTHER MEDIUM
Title
Functions of bounded variation and their Fourier transforms.
International Standard Book Number
9783030044282
TOPICAL NAME USED AS SUBJECT
Fourier transformations.
Functions of bounded variation.
Fourier transformations.
Functions of bounded variation.
DEWEY DECIMAL CLASSIFICATION
Number
515/
.
8
Edition
23
LIBRARY OF CONGRESS CLASSIFICATION
Class number
QA331
.
5
PERSONAL NAME - PRIMARY RESPONSIBILITY
Liflyand, Elijah
ORIGINATING SOURCE
Date of Transaction
20200823080537.0
Cataloguing Rules (Descriptive Conventions))
pn
ELECTRONIC LOCATION AND ACCESS
Electronic name
مطالعه متن کتاب [Book]
Y
