Access the full text.
Sign up today, get DeepDyve free for 14 days.
(1971)
Analyse harmonique non-commutative sur certains espaces homogènes, Lecture Notes in Math
G. David, S. Semmes (1993)
Analysis of and on uniformly rectifiable sets
(1971)
An introduction to Fourier analysis on Euclidean spaces (Princeton
C. Kenig (1994)
Harmonic Analysis Techniques for Second Order Elliptic Boundary Value Problems
E. Stein, Timothy Murphy (1993)
Harmonic Analysis: Real-Variable Methods, Orthogonality, and Oscillatory Integrals
(1985)
Weighted norm inequalities and related topics (NorthHolland
A. Carbery, S. Wainger, James Wright (1995)
Hilbert transforms and maximal functions associated to flat curves on the Heisenberg groupJournal of the American Mathematical Society, 8
Singular and maximal Radon transforms
(1993)
Sogge, Fourier integrals in classical analysis, Cambridge Tracts in Math
G. Weiss, S. Wainger (1981)
Harmonic Analysis in Euclidean Spaces
E. Stein, G. Weiss (1971)
Introduction to Fourier Analysis on Euclidean Spaces.
Z. Nehari (1950)
Bounded analytic functionsBulletin of the American Mathematical Society, 57
J. Peetre (1976)
New thoughts on Besov spaces
S. Superiore, A. Korányi, S. Vági (1971)
Singular integrals on homogeneous spaces and some problems of classical analysisAnnali Della Scuola Normale Superiore Di Pisa-classe Di Scienze, 25
(1995)
Geometry of sets and measures in Euclidean space, Cambridge Stud
L p estimates for the bilinear Hilbert transform for 2 < p < ∞
G. Mockenhaupt, A. Seeger, C. Sogge (1992)
Wave front sets, local smoothing and Bourgain's circular maximal theoremAnnals of Mathematics, 136
A. Carbery, J. Vance, S. Wainger, James Wright (1995)
A Variant of the Notion of a Space of Homogeneous TypeJournal of Functional Analysis, 132
J. Duoandikoetxea, J. Francia (1986)
Maximal and singular integral operators via Fourier transform estimatesInventiones mathematicae, 84
(1982)
Boundary value problems on Lipschitz domains', Studies in partial differential equations
J. Cooper (1973)
SINGULAR INTEGRALS AND DIFFERENTIABILITY PROPERTIES OF FUNCTIONSBulletin of The London Mathematical Society, 5
M. Guzman (1970)
A covering lemma with applications to differentiability of measures and singular integral operatorsStudia Mathematica, 34
(1992)
Wavelets and operators, Cambridge Stud
(1991)
Singular integrals and rectifiable sets in R: au delà des graphes Lipschitziens, Astérisque
J. Bourgain (1991)
Lp-Estimates for oscillatory integrals in several variablesGeometric & Functional Analysis GAFA, 1
C. Sadosky (1979)
Interpolation of Operators and Singular Integrals: An Introduction to Harmonic Analysis
G. David, S. Semmes (1991)
Singular integrals and rectifiable sets in R[n] : au-delà des graphes lipschitziensAstérisque
(1995)
A version of Cotlar’s Lemma for L spaces and some applications
E. Stein (2020)
Oscillatory Integrals Related to Radon-like Transforms
L. Evans (1990)
Weak convergence methods for nonlinear partial differential equations, 74
(1982)
Boundary value problems on Lipschitz domains’, Studies in partial differential equations, Math
R. Durrett (1984)
Brownian motion and martingales in analysis
R. Coifman, Guido Weiss (1971)
Analyse Hamonique Non-Commutative sur Certains Espaces Homogenes
(1995)
A version of Cotlar's Lemma for L p spaces and some applications
T. Wolff (1995)
An improved bound for Kakeya type maximal functions
A. Torchinsky (1986)
Real-Variable Methods in Harmonic Analysis
(1984)
Brownian motion and martingales in analysis (Wadsworth
(1986)
Elliptic boundary value problems on Lipschitz domains’, Beijing lectures in harmonic analysis
C. Sogge (1993)
Fourier Integrals in Classical Analysis
J. Bourgain (1986)
Averages in the plane over convex curves and maximal operatorsJournal d’Analyse Mathématique, 47
Abstract Well over two decades have now passed since the publication of the classic books Singular integrals and differentiability properties of functions by E. M. Stein [32] and An introduction to Fourier analysis on Euclidean spaces by E. M. Stein and G. Weiss [37]. These two texts would, I am sure, be universally regarded as defining the ‘common core’ of harmonic analysis in the Calderón–Zygmund tradition in the early 1970s. What has been going on in the subject since then? 1991 Mathematics Subject Classification 42-02, 42-XX, 42Bxx. © London Mathematical Society
Bulletin of the London Mathematical Society – Oxford University Press
Published: Jan 1, 1998
Read and print from thousands of top scholarly journals.
Already have an account? Log in
Bookmark this article. You can see your Bookmarks on your DeepDyve Library.
To save an article, log in first, or sign up for a DeepDyve account if you don’t already have one.
Copy and paste the desired citation format or use the link below to download a file formatted for EndNote
Access the full text.
Sign up today, get DeepDyve free for 14 days.
All DeepDyve websites use cookies to improve your online experience. They were placed on your computer when you launched this website. You can change your cookie settings through your browser.