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Harmonic Analysis in Euclidean Spaces, Part 1

About this Title

Guido Weiss and Stephen Wainger, Editors

Publication: Proceedings of Symposia in Pure Mathematics
Publication Year: 1979; Volume 35.1
ISBNs: 978-0-8218-1436-9 (print); 978-0-8218-9323-4 (online)
DOI: https://doi.org/10.1090/pspum/035.1

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Table of Contents

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Front/Back Matter

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Real harmonic analysis

• E. M. Stein – Some problems in harmonic analysis [MR 545235]
• R. R. Coifman – On operators of harmonic analysis which are not convolutions [MR 545236]
• Antonio Córdoba – Maximal functions, covering lemmas and Fourier multipliers [MR 545237]
• R. Fefferman – Covering lemmas, maximal functions and multiplier operators in Fourier analysis [MR 545238]
• Miguel de Guzmán – Besicovitch theory of linearly measurable sets and Fourier analysis [MR 545239]
• Benjamin Muckenhoupt – Weighted norm inequalities for classical operators [MR 545240]
• Stephen Wainger – Applications of Fourier transforms to averages over lower-dimensional sets [MR 545241]
• Alexander Nagel, Elias M. Stein and Stephen Wainger – Hilbert transforms and maximal functions related to variable curves [MR 545242]
• Jacques Peyrière – Regularity of spherical means [MR 545243]
• Elena Prestini – Restriction theorems for the Fourier transform to some manifolds in $\mathbf {R}^{n}$ [MR 545244]
• Peter A. Tomas – Restriction theorems for the Fourier transform [MR 545245]
• Richard J. Bagby – Riesz potentials and Fourier multipliers [MR 545246]
• Leonede De Michele and Ian R. Inglis – Fourier multipliers vanishing at infinity [MR 545247]
• Alberto Torchinsky – Weighted norm inequalities for the Littlewood-Paley function $g^*_{\lambda }$ [MR 545248]
• Wo Sang Young – Weighted norm inequalities for multipliers [MR 545249]
• Jan-Olov Strömberg – Non-equivalence between two kinds of conditions on weight functions [MR 545250]
• Daniel W. Stroock – Some remarks about Beckner’s inequality [MR 545251]
• Fred B. Weissler – Hypercontractive estimates for semigroups [MR 545252]
• William C. Connett – Singular integrals near $L^{1}$ [MR 545253]
• Bogdan M. Baishanski – On Carleson’s convergence theorem for $L^{2}$ functions [MR 545254]
• Daniel Waterman – Multiple Fourier series of functions of generalized bounded variation [MR 545255]
• G. Wilmes – Some inequalities for Riesz potentials of trigonometric polymonials of several variables [MR 545256]
• Björn E. J. Dahlberg – A note on Sobolev spaces [MR 545257]

Hardy spaces and BMO

• Guido Weiss – Some problems in the theory of Hardy spaces [MR 545258]
• Colin Bennett and Robert Sharpley – Weak-type inequalities for $H^{p}$ and BMO [MR 545259]
• R. R. Coifman and Björn Dahlberg – Singular integral characterizations of nonisotropic $H^{p}$ spaces and the F. and M. Riesz theorem [MR 545260]
• Roberto A. Macías and Carlos Segovia – A maximal theory for generalized Hardy spaces [MR 545261]
• David Goldberg – Local Hardy spaces [MR 545262]
• W. R. Madych – Distributions with strong maximal functions in $L^{p}(\mathbf {R}^{n})$ [MR 545263]
• José García-Cuerva – Weighted Hardy spaces [MR 545264]
• Carlos E. Kenig – Weighted Hardy spaces on Lipschitz domains [MR 545265]
• Robert H. Latter – The atomic decomposition of Hardy spaces [MR 545266]
• Mitchell H. Taibleson and Guido Weiss – The molecular characterization of Hardy spaces [MR 545267]
• Fulvio Ricci and Guido Weiss – A characterization of $H^{1}(\Sigma _{n-1})$ [MR 545268]
• John B. Garnett – Two constructions in BMO [MR 545269]
• James E. Brennan – Invariant subspaces and subnormal operators [MR 545270]

Harmonic functions, potential theory and theory of functions of one complex variable

• Björn E. J. Dahlberg – Harmonic functions in Lipschitz domains [MR 545271]
• Adam Korányi – A survey of harmonic functions on symmetric spaces [MR 545272]
• Michael Benedicks – Positive harmonic functions vanishing on the boundary of certain domains in $\mathbf {R}^{n+1}$ [MR 545273]
• Harry Kesten – Positive harmonic functions with zero boundary values [MR 545274]
• Umberto Neri – Harmonic functions with BMO boundary values [MR 545275]
• David R. Adams – $L^{p}$-capacitary integrals with some applications [MR 545276]
• Victor L. Shapiro and Grant V. Welland – Sobolov spaces, the Navier-Stokes equations and capacity [MR 545277]
• Lars Inge Hedberg – Approximation in $L^{p}$ by analytic and harmonic functions [MR 545278]
• Mischa Cotlar and Cora Sadosky – On the Helson-Szegő theorem and a related class of modified Toeplitz kernels [MR 545279]
• Albert Bernstein, II – Some sharp inequalities for conjugate functions [MR 545280]
• Peter W. Jones – Constructions for BMO$(\mathbf {R})$ and $A_{p}(\mathbf {R}^{n})$ [MR 545281]
• Sun-Yung A. Chang – Structure of some subalgebra of $L^{\infty }$ of the torus [MR 545282]
• David A. Stegenga – A geometric condition which implies BMOA [MR 545283]
• Paul Koosis – Proof of the Beurling-Malliavin theorem by duality and harmonic estimation [MR 545284]
• R. Kaufman – Zero sets of absolutely convergent Taylor series [MR 545285]
• J. Wermer – Capacity and uniform algebras [MR 545286]
• Douglas N. Clark – Following functions of class $H^{2}$ [MR 545287]
• Richard Rochberg – A Hankel type operator arising in deformation theory [MR 9810]
• R. R. Coifman and R. Rochberg – Representation theorems for holomorphic and harmonic functions [MR 545288]