A01=Kehe Zhu
advanced functional analysis topics
Author_Kehe Zhu
banach
Banach Algebra
Borel Set
Bounded Borel Function
C*-algebra theory
Category=PBF
Category=UYA
Closed Unit Ball
Commutative Banach Algebra
compact
Compact Hausdorff Space
Continuous Functional Calculus
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Finite Positive Borel Measure
Functional Calculus
GNS construction
hausdorff
hilbert
Hilbert Space
ideal
Infinite Dimensional Hilbert Space
Kaplansky density
Locally Convex Space
maximal
Maximal Ideal Space
neumann
normal operators
Partial Isometry
Polar Decomposition
Positive Borel Measure
projection equivalence
Riesz Representation Theorem
Self-adjoint Operator
Separable Hilbert Space
space
spectral analysis
Spectral Mapping Theorem
Spectral Theorem
Strong Operator Topology
von
Von Neumann Algebra
weak
Weak Operator Topology
Weak Star Topology
Product details
- ISBN 9780849378751
- Weight: 400g
- Dimensions: 156 x 234mm
- Publication Date: 27 May 1993
- Publisher: Taylor & Francis Inc
- Publication City/Country: US
- Product Form: Hardback
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An Introduction to Operator Algebras is a concise text/reference that focuses on the fundamental results in operator algebras. Results discussed include Gelfand's representation of commutative C*-algebras, the GNS construction, the spectral theorem, polar decomposition, von Neumann's double commutant theorem, Kaplansky's density theorem, the (continuous, Borel, and L8) functional calculus for normal operators, and type decomposition for von Neumann algebras. Exercises are provided after each chapter.
