Beijing Lectures in Harmonic Analysis
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Analytic function
Asymptotic formula
Bergman metric
Bessel function
Biholomorphism
Boundary value problem
Bounded mean oscillation
Bounded operator
Category=PBKF
Cauchy's integral formula
Characteristic function (probability theory)
Characterization (mathematics)
Coefficient
Degeneracy (mathematics)
Differential equation
Differential operator
Dirac delta function
Dirichlet problem
eq_isMigrated=1
eq_isMigrated=2
eq_nobargain
Equation
Explicit formulae (L-function)
Fatou's theorem
Fourier analysis
Fourier integral operator
Fourier transform
Fredholm theory
Fubini's theorem
Function (mathematics)
Functional calculus
Gaussian curvature
Hardy space
Harmonic analysis
Harmonic function
Harmonic measure
Heisenberg group
Hilbert space
Hilbert transform
Holomorphic function
Hyperbolic partial differential equation
Integration by parts
Laplace operator
Laplace's equation
Lebesgue measure
Linear map
Lipschitz continuity
Lipschitz domain
Lp space
Mathematical induction
Maximal function
Newtonian potential
Operator theory
Oscillatory integral
Parameter
Partial derivative
Partial differential equation
Power series
Product metric
Radon-Nikodym theorem
Riemannian manifold
Riesz representation theorem
Sign (mathematics)
Simultaneous equations
Singular function
Singular integral
Sobolev space
Statistical hypothesis testing
Stokes' theorem
Theorem
Trigonometric series
Uniformization theorem
Variable (mathematics)
Vector field
Product details
- ISBN 9780691084190
- Weight: 624g
- Dimensions: 152 x 229mm
- Publication Date: 21 Nov 1986
- Publisher: Princeton University Press
- Publication City/Country: US
- Product Form: Paperback
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Based on seven lecture series given by leading experts at a summer school at Peking University, in Beijing, in 1984. this book surveys recent developments in the areas of harmonic analysis most closely related to the theory of singular integrals, real-variable methods, and applications to several complex variables and partial differential equations. The different lecture series are closely interrelated; each contains a substantial amount of background material, as well as new results not previously published. The contributors to the volume are R. R. Coifman and Yves Meyer, Robert Fcfferman, Carlos K. Kenig, Steven G. Krantz, Alexander Nagel, E. M. Stein, and Stephen Wainger.
