Ebook: Principal Functions
Author: Burton Rodin Leo Sario (auth.)
- Tags: Mathematics general
- Series: The University Series in Higher Mathematics
- Year: 1968
- Publisher: Springer-Verlag New York
- Edition: 1
- Language: English
- pdf
During the decade and a half that has elapsed since the intro duction of principal functions (Sario [8 J), they have become impor tant tools in an increasing number of branches of modern mathe matics. The purpose of the present research monograph is to systematically develop the theory of these functions and their ap plications on Riemann surfaces and Riemannian spaces. Apart from brief background information (see below), nothing contained in this monograph has previously appeared in any other book. The basic idea of principal functions is simple: Given a Riemann surface or a Riemannian space R, a neighborhood A of its ideal boundary, and a harmonic function s on A, the principal function problem consists in constructing a harmonic function p on all of R which imitates the behavior of s in A. Here A need not be connected, but may include neighborhoods of isolated points deleted from R. Thus we are dealing with the general problem of constructing harmonic functions with given singularities and a prescribed behavior near the ideal boundary. The function p is called the principal function corresponding to the given A, s, and the mode of imitation of s by p. The significance of principal functions is in their versatility.
Content:
Front Matter....Pages i-xviii
Introduction: What are Principal Functions?....Pages 1-13
Prerequisite Riemann Surface Theory....Pages 14-37
The Normal Operator Method....Pages 38-80
Principal Functions....Pages 81-137
Capacity, Stability, and Extremal Length....Pages 138-192
Classification Theory....Pages 193-210
Analytic Mappings....Pages 211-231
Principal Forms and Fields on Riemannian Spaces....Pages 232-286
Principal Functions on Harmonic Spaces....Pages 287-304
Back Matter....Pages 305-347
Content:
Front Matter....Pages i-xviii
Introduction: What are Principal Functions?....Pages 1-13
Prerequisite Riemann Surface Theory....Pages 14-37
The Normal Operator Method....Pages 38-80
Principal Functions....Pages 81-137
Capacity, Stability, and Extremal Length....Pages 138-192
Classification Theory....Pages 193-210
Analytic Mappings....Pages 211-231
Principal Forms and Fields on Riemannian Spaces....Pages 232-286
Principal Functions on Harmonic Spaces....Pages 287-304
Back Matter....Pages 305-347
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