Real-Variable Methods in Harmonic Analysis
Alberto Torchinsky$22.91
$26.95
"A very good choice." -- MathSciNet, American Mathematical Society
An exploration of the unity of several areas in harmonic analysis, this self-contained text emphasizes real-variable methods. Appropriate for advanced undergraduate and graduate students, it starts with classical Fourier series and discusses summability, norm convergence, and conjugate function. An examination of the Hardy-Littlewood maximal function and the Calder n-Zygmund decomposition is followed by explorations of the Hilbert transform and properties of harmonic functions. Additional topics include the Littlewood-Paley theory, good lambda inequalities, atomic decomposition of Hardy spaces, Carleson measures, Cauchy integrals on Lipschitz curves, and boundary value problems. 1986 edition.
Binding Type: Paperback
Publisher: Dover Publications
Published: 04/09/2004
ISBN: 9780486435084
Pages: 462
Weight: 1.07lbs
Size: 8.46h x 5.46w x 0.95d
An exploration of the unity of several areas in harmonic analysis, this self-contained text emphasizes real-variable methods. Appropriate for advanced undergraduate and graduate students, it starts with classical Fourier series and discusses summability, norm convergence, and conjugate function. An examination of the Hardy-Littlewood maximal function and the Calder n-Zygmund decomposition is followed by explorations of the Hilbert transform and properties of harmonic functions. Additional topics include the Littlewood-Paley theory, good lambda inequalities, atomic decomposition of Hardy spaces, Carleson measures, Cauchy integrals on Lipschitz curves, and boundary value problems. 1986 edition.
Binding Type: Paperback
Publisher: Dover Publications
Published: 04/09/2004
ISBN: 9780486435084
Pages: 462
Weight: 1.07lbs
Size: 8.46h x 5.46w x 0.95d