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Additive Subgroups of Topological Vector Spaces

The Pontryagin-van Kampen duality theorem and the Bochner theorem on positive-definite functions are known to be true for certain abelian topological groups that are not locally compact. The book sets out to present in a systematic way the existing material. It is based on the original notion of a n...

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Bibliographic Details
Main Author: Banaszczyk, Wojciech
Format: eBook
Language:English
Published: Berlin, Heidelberg Springer Berlin Heidelberg 1991, 1991
Edition:1st ed. 1991
Series:Lecture Notes in Mathematics
Subjects:
Functional Analysis
Algebraic Topology
Mathematical Analysis
Topological Groups And Lie Groups
Lie Groups
Topological Groups
Analysis
Discrete Mathematics
Online Access:
Collection: Springer Book Archives -2004 - Collection details see MPG.ReNa
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245 0 0 |a Additive Subgroups of Topological Vector Spaces  |h Elektronische Ressource  |c by Wojciech Banaszczyk 
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505 0 |a Preliminaries -- Exotic groups -- Nuclear groups -- The bochner theorem -- Pontryagin duality 
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653 |a Topological Groups and Lie Groups 
653 |a Lie groups 
653 |a Topological groups 
653 |a Analysis 
653 |a Discrete Mathematics 
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653 |a Discrete mathematics 
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082 0 |a 514.2 
520 |a The Pontryagin-van Kampen duality theorem and the Bochner theorem on positive-definite functions are known to be true for certain abelian topological groups that are not locally compact. The book sets out to present in a systematic way the existing material. It is based on the original notion of a nuclear group, which includes LCA groups and nuclear locally convex spaces together with their additive subgroups, quotient groups and products. For (metrizable, complete) nuclear groups one obtains analogues of the Pontryagin duality theorem, of the Bochner theorem and of the Lévy-Steinitz theorem on rearrangement of series (an answer to an old question of S. Ulam). The book is written in the language of functional analysis. The methods used are taken mainly from geometry of numbers, geometry of Banach spaces and topological algebra. The reader is expected only to know the basics of functional analysis and abstract harmonic analysis 

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