Functional calculi
著者
書誌事項
Functional calculi
World Scientific, c2013
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注記
Includes bibliographical references and index
内容説明・目次
内容説明
A functional calculus is a construction which associates with an operator or a family of operators a homomorphism from a function space into a subspace of continuous linear operators, i.e. a method for defining "functions of an operator". Perhaps the most familiar example is based on the spectral theorem for bounded self-adjoint operators on a complex Hilbert space.This book contains an exposition of several such functional calculi. In particular, there is an exposition based on the spectral theorem for bounded, self-adjoint operators, an extension to the case of several commuting self-adjoint operators and an extension to normal operators. The Riesz operational calculus based on the Cauchy integral theorem from complex analysis is also described. Finally, an exposition of a functional calculus due to H. Weyl is given.
目次
- Vector and Operator Valued Measures
- Functions of a Self Adjoint Operator
- Functions of Several Commuting Self Adjoint Operators
- The Spectral Theorem for Normal Operators
- Integrating Vector Valued Functions
- An Abstract Functional Calculus
- The Riesz Operational Calculus
- Weyl's Functional Calculus
- Appendices: The Orlicz - Pettis Theorem
- The Spectrum of an Operator
- Self Adjoint, Normal and Unitary Operators
- Sesquilinear Functionals
- Tempered Distributions and the Fourier Transform.
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