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Locally Convex Quasi *-Algebras and Their Representations - 2257 (1st ed. 2020.)

Fragoulopoulou, MariaTrapani, Camillo
Part of the Lecture Notes in Mathematics series
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This book offers a review of the theory of locally convex quasi *-algebras, authored by two of its contributors over the last 25 years. Quasi *-algebras are partial algebraic structures that are motivated by certain applications in Mathematical Physics. They arise in a natural way by completing a *-algebra under a locally convex *-algebra topology, with respect to which the multiplication is separately continuous.

 
Among other things, the book presents an unbounded representation theory of quasi *-algebras, together with an analysis of normed quasi *-algebras, their spectral theory and a study of the structure of locally convex quasi *-algebras. Special attention is given to the case where the locally convex quasi *-algebra is obtained by completing a C*-algebra under a locally convex *-algebra topology, coarser than the C*-topology.

Introducing the subject to graduate students and researchers wishing to build on their knowledge of the usual theory of Banach and/or locally convex algebras, this approach is supported by basic results and a wide variety of examples.

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Product Details
Springer
3030377059 / 9783030377052
eBook (Adobe Pdf, EPUB)
01/01/2020
English
267 pages
Copy: 10%; print: 10%
PBF Algebra, PBKF Functional analysis & transforms
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