Hardy Spaces on Homogeneous Groups

Name: Hardy Spaces on Homogeneous Groups
Brand: Princeton University Press
SKU: 9780691083100
Price: 107.99 EUR
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Product variants

A01=Elias M. Stein

A01=Gerald B. Folland

Absolute value

Antiderivative

Antiisomorphism

Approximate identity

Author_Elias M. Stein

Author_Gerald B. Folland

Automorphism

Banach space

Bounded function

Bounded mean oscillation

Boundedness

Category=PBKF

Cauchy-Riemann equations

Central series

Characteristic function (probability theory)

Characterization (mathematics)

Class function (algebra)

Complex analysis

Complex conjugate

Complex number

Continuous function

Convolution

Differential equation

Differential operator

Dimension (vector space)

Dual space

Eigenvalues and eigenvectors

eq_isMigrated=1

eq_isMigrated=2

eq_nobargain

Equivalence class

Euclidean vector

Existential quantification

Exponential map (Lie theory)

Fatou's theorem

Fourier transform

Function (mathematics)

Green's theorem

Hardy space

Harmonic analysis

Harmonic function

Heat kernel

Heisenberg group

Hilbert space

Holomorphic function

Interpolation theorem

Iwasawa decomposition

Laplace's equation

Lie group

Linear combination

Linear space (geometry)

Lp space

Maximal compact subgroup

Maximal function

Maximum principle

Mean value theorem

One-parameter group

Orthonormal basis

Partial differential equation

Partition of unity

Poisson kernel

Scalar multiplication

Semigroup

Singular integral

Special case

Square (algebra)

Subgroup

Subset

Support (mathematics)

Symmetric space

Theorem

Topological space

Topology

Upper half-plane

Variable (mathematics)

Vector field

Product details

ISBN 9780691083100
Weight: 397g
Dimensions: 152 x 235mm
Publication Date: 21 Jun 1982
Publisher: Princeton University Press
Publication City/Country: US
Product Form: Paperback

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The object of this monograph is to give an exposition of the real-variable theory of Hardy spaces (HP spaces). This theory has attracted considerable attention in recent years because it led to a better understanding in Rn of such related topics as singular integrals, multiplier operators, maximal functions, and real-variable methods generally. Because of its fruitful development, a systematic exposition of some of the main parts of the theory is now desirable. In addition to this exposition, these notes contain a recasting of the theory in the more general setting where the underlying Rn is replaced by a homogeneous group. The justification for this wider scope comes from two sources: 1) the theory of semi-simple Lie groups and symmetric spaces, where such homogeneous groups arise naturally as "boundaries," and 2) certain classes of non-elliptic differential equations (in particular those connected with several complex variables), where the model cases occur on homogeneous groups. The example which has been most widely studied in recent years is that of the Heisenberg group.