Normal view MARC view ISBD view

The Kernel function and conformal mapping / Stefan Bergman

Auteur principal : Bergman, Stefan, 1895-1977, AuteurType de document : MonographieCollection : Mathematical surveys, 5Langue : anglais.Pays : Etats Unis.Mention d'édition: 2nd revised editionÉditeur : Providence : American Mathematical Society, 1970Description : 1 vol. (x-257 p.) : fig. ; 26 cmISBN : 9780821815052.Bibliographie : Bibliogr. p. 233-252. Index.Sujet MSC : 30C40, Functions of a complex variable -- Geometric function theory, Kernel functions and applications
30-02, Functions of a complex variable, Research exposition (monographs, survey articles)
30C35, Functions of a complex variable -- Geometric function theory, General theory of conformal mappings
En-ligne : MathSciNet | AMS
Tags from this library: No tags from this library for this title. Log in to add tags.
Current location Call number Status Date due Barcode
Salle R
30 BER (Browse shelf) Available 05816-01
Salle R
30 BER (Browse shelf) Available 05816-02
Salle R
30 BER (Browse shelf) Checked out 16/02/2019 05816-03

Bibliogr. p. 233-252. Index

The Kernel Function and Conformal Mapping by Stefan Bergman is a revised edition of The Kernel Function. The author has made extensive changes in the original volume. The present book will be of interest not only to mathematicians, but also to engineers, physicists, and computer scientists. The applications of orthogonal functions in solving boundary value problems and conformal mappings onto canonical domains are discussed; and publications are indicated where programs for carrying out numerical work using high-speed computers can be found.

The unification of methods in the theory of functions of one and several complex variables is one of the purposes of introducing the kernel function and the domains with a distinguished boundary. This approach has been extensively developed during the last two decades. This second edition of Professor Bergman's book reviews this branch of the theory including recent developments not dealt with in the first edition. The presentation of the topics is simple and presupposes only knowledge of an elementary course in the theory of analytic functions of one variable. (source : AMS)

There are no comments for this item.

Log in to your account to post a comment.