Written by an author who was at the forefront of developments in multivariable spectral theory during the seventies and the eighties, this book describes the spectral mapping theorem in various settings. In this second edition, the Bluffer's Guide has been revised and expanded, whilst preserving the engaging style of the first.
Starting with a summary of the basic algebraic systems – semigroups, rings and linear algebras – the book quickly turns to topological-algebraic systems, including Banach algebras, to set up the basic language of algebra and analysis. Key aspects of spectral theory are covered, in one and several variables. Finally the case of an arbitrary set of variables is discussed.
Spectral Mapping Theorems is an accessible and easy-to-read guide, providing a convenient overview of the topic to both students and researchers.
Author(s): Robin Harte
Edition: 2
Publisher: Springer
Year: 2023
Language: English
Pages: 192
City: Cham
Tags: Spectral Mapping Theorems
Preface to the Second Edition
Preface to the First Edition
Contents
1 Algebra
1.1 Semigroups
1.2 Invertibility
1.3 Zero Divisors
1.4 Commutivity
1.5 Homomorphisms
1.6 Groups
1.7 Rings
1.8 Ideals
1.9 Fredholm Theory
1.10 Exactness
1.11 Block Structure
1.12 Linear Spaces and Algebras
1.13 Linear Operators
1.14 Hyper Exactness
2 Topology
2.1 Topological Spaces
2.2 Continuity
2.3 Limits
2.4 Metric Spaces
2.5 Compactness
2.6 Boundaries, Hulls and Accumulation Points
2.7 Connectedness and Homotopy
2.8 Disconnectedness
3 Topological Algebra
3.1 Topological Semigroups
3.2 Spectral Topology
3.3 Normed Algebra
3.4 Banach Algebra
3.5 Bounded Operators
3.6 Duality
3.7 Enlargement
3.8 Functions
3.9 Topological Zero Divisors
3.10 The Riesz Lemmas
3.11 Polar Decomposition
4 Spectral Theory
4.1 Spectrum
4.2 Left and Right Point Spectrum
4.3 Banach Algebra Spectral Theory
4.4 Approximate Point Spectrum
4.5 Boundary Spectrum
4.6 Exponential Spectrum
4.7 Essential Spectrum
4.8 Local Spectrum
4.9 Spectral Pictures
4.10 Müller Regularity
4.11 Numerical Range
4.12 Invariant Subspaces
4.13 Peripheral Spectrum
5 Several Variables
5.1 Non Commutative Polynomials
5.2 Relative and Restricted Spectrum
5.3 The Spectral Mapping Theorem
5.4 Gelfand's Theorem
5.5 Joint Approximate Spectrum
5.6 Tensor Products
5.7 Elementary Operators
5.8 Quasicommuting Systems
5.9 Holomorphic Left Inverses
5.10 Operator Matrices
5.11 Spectral Disjointness
5.12 Joint Local Spectrum
5.13 Taylor Invertibility
5.14 Fredholm, Weyl and Browder Theory
5.15 Joint Boundary Spectrum
5.16 Bass Stable Rank
5.17 Determinant and Adjugate
6 Many Variables
6.1 Infinite Systems
6.2 Vector Valued Spectra
6.3 Waelbroeck Algebras
6.4 Categories and Functors
6.5 Functional Calculus
6.6 Number Theory
References
Index
Symbol Index
