Vector-Valued Functions and their Applications by Chuang-Gan HuVector-Valued Functions and their Applications by Chuang-Gan Hu

Vector-Valued Functions and their Applications

byChuang-Gan Hu, Chung-Chun Yang

Paperback | December 6, 2010

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This book is the first to be devoted to the theory of vector-valued functions with one variable. This theory is one of the fundamental tools employed in modern physics, the spectral theory of operators, approximation of analytic operators, analytic mappings between vectors, and vector-valued functions of several variables. The book contains three chapters devoted to the theory of normal functions, Hp-space, and vector-valued functions and their applications. Among the topics dealt with are the properties of complex functions in a complex plane and infinite-dimensional spaces, and the solution of vector-valued integral equations and boundary value problems by complex analysis and functional analysis, which involve methods which can be applied to problems in operations research and control theory. Much original research is included. This volume will be of interest to those whose work involves complex analysis and control theory, and can be recommended as a graduate text in these areas.
Title:Vector-Valued Functions and their ApplicationsFormat:PaperbackDimensions:171 pages, 9.25 × 6.1 × 0 inPublished:December 6, 2010Publisher:Springer NetherlandsLanguage:English

The following ISBNs are associated with this title:

ISBN - 10:9048141230

ISBN - 13:9789048141234

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Table of Contents

Series Editor's Preface. Preface. 1. Theory of Normal Families. 1. Preliminaries. 2. The Normal Family of Meromorphic Functions. 3. The Distance of a Family of Functions at a Point. 4. On Meromorphic Functions with Deficient Values. 5. The Applications of the Theory of Normal Families. 6. Application to Univalent Functions. 2: HpSpace. 1. Harmonic and Subharmonic Functions. 2. The Basic Structure of Hp. 3. Hp is a Banach Space. 3: Vector-Valued Analysis. 1. Vector-Valued Functions. 2. Vector-Valued Boundary Value Problems. 3. Analysis of Locally Convex Spaces. Bibliography. Index of Symbols. Index.