Overview

A companion volume to the text ""Complex Variables: An Introduction"" by the same authors, this book further develops the theory, continuing to emphasize the role that the Cauchy-Riemann equation plays in modern complex analysis. Topics considered include: Boundary values of holomorphic functions in the sense of distributions; interpolation problems and ideal theory in algebras of entire functions with growth conditions; exponential polynomials; the G transform and the unifying role it plays in complex analysis and transcendental number theory; summation methods; and the theorem of L. Schwarz concerning the solutions of a homogeneous convolution equation on the real line and its applications in harmonic function theory.

Full Product Details

Author:   Carlos A. Berenstein ,  Roger Gay
Publisher:   Springer-Verlag New York Inc.
Imprint:   Springer-Verlag New York Inc.
Edition:   Softcover reprint of the original 1st ed. 1995
Dimensions:   Width: 15.50cm , Height: 2.50cm , Length: 23.50cm
Weight:   0.744kg
ISBN:  

9781461384472

ISBN 10:   1461384478
Pages:   482
Publication Date:   08 November 2011
Audience:   Professional and scholarly ,  Professional & Vocational
Format:   Paperback
Publisher's Status:   Active
Availability:   Manufactured on demand  
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Table of Contents

1 Boundary Values of Holomorphic Functions and Analytic Functionals.- 1.1. The Hardy Spaces in the Disk.- 1.2. Hyperfunctions.- 1.3. Analytic Functionals and Entire Functions of Exponential Type.- 1.4. Vade Mecum of Functional Analysis.- 1.5. Convolution of Analytic Functionals.- 1.6. Analytic Functionals on the Unit Circle.- 2 Interpolation and the Algebras Ap.- 2.1. The Algebras Ap.- 2.2. Interpolation with Growth Conditions.- 2.3. Ideal Theory in Ap.- 2.4. Dense Ideals in Ap(?).- 2.5. Local Ideals and Conductor Ideals in Ap.- 2.6. The Algebra A? of Entire Functions of Order at Most ?.- 3 Exponential Polynomials.- 3.1. The Ring of Exponential Polynomials.- 3.2. Distributions of Zeros of an Exponential Polynomial.- 4 Integral Valued Entire Functions.- 4.1. The G-Transform.- 4.2. Integral Valued Entire Functions.- 5 Summation Methods.- 5.1. Borel and Mittag—Leffler Summation Methods.- 5.2. The Lindelöf Indicator Function.- 5.3. The Fourier—Borel Transform of Order ? of Analytic Functionals.- 5.4. Analytic Functionals with Noncompact Carrier.- 6 Harmonic Analysis.- 6.1. Convolution Equations in ?.- 6.2. Convolution Equations in ?.- 6.3. The Equation f(z + 1) — f(z) = g(z).- 6.4. Differential Operators of Infinite Order.- 6.5. Deconvolution.- References.- Notation.

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