Generalized Analytic Continuation
Author:   William T. Ross ,  Harold S. Shapiro
Publisher:   American Mathematical Society
Edition:   illustrated edition
Volume:   No. 25
ISBN:  

9780821831755


Pages:   149
Publication Date:   30 April 2002
Format:   Paperback
Availability:   Out of stock   Availability explained
The supplier is temporarily out of stock of this item. It will be ordered for you on backorder and shipped when it becomes available.

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Generalized Analytic Continuation


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Overview

The theory of generalized analytic continuation studies continuations of meromorphic functions in situations where traditional theory says there is a natural boundary. This broader theory touches on a remarkable array of topics in classical analysis, as described in the book. The authors use the strong analogy with the summability of divergent series to motivate the subject. In this vein, for instance, theorems can be described as being ""Abelian"" or ""Tauberian"". The introductory overview carefully explains the history and context of the theory. The book addresses the following questions: (1) When can we say, in some reasonable way, that component functions of a meromorphic function on a disconnected domain, are ""continuations"" of each other? (2) What role do such ""continuations"" play in certain aspects of approximation theory and operator theory? The authors begin with a review of the works of Poincare, Borel, Wolff, Walsh, and Goncar, on continuation properties of ""Borel series"" and other meromorphic functions that are limits of rapidly convergent sequences of rational functions. They then move on to the work of Tumarkin, who looked at the continuation properties of functions in the classical Hardy space of the disk in terms of the concept of ""pseudocontinuation"". Tumarkin's work was seen in a different light by Douglas, Shapiro, and Shields in their discovery of a characterization of the cyclic vectors for the backward shift operator on the Hardy space. The authors cover this important concept of ""pseudocontinuation"" quite thoroughly since it appears in many areas of analysis. They also add a new and previously unpublished method of ""continuation"" to the list, based on formal multiplication of trigonometric series, which can be used to examine the backward shift operator on many spaces of analytic functions. The book attempts to un.

Full Product Details

Author:   William T. Ross ,  Harold S. Shapiro
Publisher:   American Mathematical Society
Imprint:   American Mathematical Society
Edition:   illustrated edition
Volume:   No. 25
Weight:   0.320kg
ISBN:  

9780821831755


ISBN 10:   0821831755
Pages:   149
Publication Date:   30 April 2002
Audience:   College/higher education ,  Professional and scholarly ,  Postgraduate, Research & Scholarly ,  Professional & Vocational
Format:   Paperback
Publisher's Status:   Active
Availability:   Out of stock   Availability explained
The supplier is temporarily out of stock of this item. It will be ordered for you on backorder and shipped when it becomes available.

Table of Contents

Overview Notation and preliminaries The Poincare example Borel's ideas and their later development Goncar continuation Pseudocontinuation A continuation involving almost periodic functions Continuation by formal multiplication of series Generalized analytic continuation List of symbols Bibliography Index.

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