S. S. Kutateladze (auth.)0792338987, 9780792338987
to the English Translation This is a concise guide to basic sections of modern functional analysis. Included are such topics as the principles of Banach and Hilbert spaces, the theory of multinormed and uniform spaces, the Riesz-Dunford holomorphic functional calculus, the Fredholm index theory, convex analysis and duality theory for locally convex spaces. With standard provisos the presentation is self-contained, exposing about a h- dred famous “named” theorems furnished with complete proofs and culminating in the Gelfand-Nalmark-Segal construction for C*-algebras. The first Russian edition was printed by the Siberian Division of “Nauka” P- lishers in 1983. Since then the monograph has served as the standard textbook on functional analysis at the University of Novosibirsk. This volume is translated from the second Russian edition printed by the Sobolev Institute of Mathematics of the Siberian Division of the Russian Academy of Sciences· in 1995. It incorporates new sections on Radon measures, the Schwartz spaces of distributions, and a supplementary list of theoretical exercises and problems. This edition was typeset using AMS-‘lEX, the American Mathematical Society’s ‘lEX system. To clear my conscience completely, I also confess that := stands for the definor, the assignment operator, signifies the end of the proof. |
Table of contents :
Front Matter….Pages i-xiv
An Excursion into Set Theory….Pages 1-9
Vector Spaces….Pages 10-19
Convex Analysis….Pages 20-39
An Excursion into Metric Spaces….Pages 40-55
Multinormed and Banach Spaces….Pages 56-79
Hilbert Spaces….Pages 80-99
Principles of Banach Spaces….Pages 100-119
Operators in Banach Spaces….Pages 120-145
An Excursion into General Topology….Pages 146-168
Duality and Its Applications….Pages 169-212
Banach Algebras….Pages 213-235
Back Matter….Pages 237-277 |
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