Composition operators and classical function theory - Info and Reading Options
By Joel H. Shapiro
"Composition operators and classical function theory" was published by Springer-Verlag in 1993 - New York, it has 223 pages and the language of the book is English.
“Composition operators and classical function theory” Metadata:
- Title: ➤ Composition operators and classical function theory
- Author: Joel H. Shapiro
- Language: English
- Number of Pages: 223
- Publisher: Springer-Verlag
- Publish Date: 1993
- Publish Location: New York
“Composition operators and classical function theory” Subjects and Themes:
- Subjects: ➤ Composition operators - Geometric function theory - Functions of complex variables - Operator theory - Mathematics - Global analysis (Mathematics) - Analysis
Edition Specifications:
- Pagination: xiii, 223 p. :
Edition Identifiers:
- The Open Library ID: OL1416588M - OL3934110W
- Online Computer Library Center (OCLC) ID: 28505377
- Library of Congress Control Number (LCCN): 93026147
- ISBN-13: 9780387940670 - 9783540940678
- ISBN-10: 0387940677 - 3540940677
- All ISBNs: 0387940677 - 3540940677 - 9780387940670 - 9783540940678
AI-generated Review of “Composition operators and classical function theory”:
"Composition operators and classical function theory" Description:
The Open Library:
The study of composition operators forges links between fundamental properties of linear operators and beautiful results from the classical theory of analytic functions. This book provides a self-contained introduction to both the subject and its function-theoretic underpinnings. The development is geometrically motivated, and accessible to anyone who has studied basic graduate-level real and complex analysis. The work explores how operator-theoretic issues such as boundedness, compactness, and cyclicity evolve - in the setting of composition operators on the Hilbert space H2 into questions about subordination, value distribution, angular derivatives, iteration, and functional equations. Each of these classical topics is developed fully, and particular attention is paid to their common geometric heritage as descendants of the Schwarz Lemma.
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