Noncommutative measures and Lp and Orlicz Spaces, with Applications to Quantum Physics
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Noncommutative measures and Lp and Orlicz Spaces, with Applications to Quantum Physics
Labuschagne, Louis; Goldstein, Stanislaw
Oxford University Press
04/2025
608
Mole
9780198950219
Pré-lançamento - envio 15 a 20 dias após a sua edição
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Preface
Introduction
Preliminaries
Part 1: Foundational Examples
1: Abelian von Neumann algebras
2: The Schatten-von Neumann classes
Part 2: Tracial case
3: Noncommutative measure theory U+02014 tracial case
4: Weights and densities
5: Basic theory of decreasing rearrangements
6: ???? and Orlicz spaces in the tracial case
7: Real interpolation and monotone spaces
Part 3: General case
8: Basic elements of modular theory
9: Crossed products
10: Lp: ???? and Orlicz spaces for general von Neumann algebras
Part 4: Advanced Theory and Applications
11: Complex interpolation of noncommutative ???? spaces
12: Extensions of maps to ????(M) spaces and applications
13: Haagerup's reduction theorem
14: Applications to quantum physics
Bibliography
Notation Index
Subject Index
Introduction
Preliminaries
Part 1: Foundational Examples
1: Abelian von Neumann algebras
2: The Schatten-von Neumann classes
Part 2: Tracial case
3: Noncommutative measure theory U+02014 tracial case
4: Weights and densities
5: Basic theory of decreasing rearrangements
6: ???? and Orlicz spaces in the tracial case
7: Real interpolation and monotone spaces
Part 3: General case
8: Basic elements of modular theory
9: Crossed products
10: Lp: ???? and Orlicz spaces for general von Neumann algebras
Part 4: Advanced Theory and Applications
11: Complex interpolation of noncommutative ???? spaces
12: Extensions of maps to ????(M) spaces and applications
13: Haagerup's reduction theorem
14: Applications to quantum physics
Bibliography
Notation Index
Subject Index
Este título pertence ao(s) assunto(s) indicados(s). Para ver outros títulos clique no assunto desejado.
Preface
Introduction
Preliminaries
Part 1: Foundational Examples
1: Abelian von Neumann algebras
2: The Schatten-von Neumann classes
Part 2: Tracial case
3: Noncommutative measure theory U+02014 tracial case
4: Weights and densities
5: Basic theory of decreasing rearrangements
6: ???? and Orlicz spaces in the tracial case
7: Real interpolation and monotone spaces
Part 3: General case
8: Basic elements of modular theory
9: Crossed products
10: Lp: ???? and Orlicz spaces for general von Neumann algebras
Part 4: Advanced Theory and Applications
11: Complex interpolation of noncommutative ???? spaces
12: Extensions of maps to ????(M) spaces and applications
13: Haagerup's reduction theorem
14: Applications to quantum physics
Bibliography
Notation Index
Subject Index
Introduction
Preliminaries
Part 1: Foundational Examples
1: Abelian von Neumann algebras
2: The Schatten-von Neumann classes
Part 2: Tracial case
3: Noncommutative measure theory U+02014 tracial case
4: Weights and densities
5: Basic theory of decreasing rearrangements
6: ???? and Orlicz spaces in the tracial case
7: Real interpolation and monotone spaces
Part 3: General case
8: Basic elements of modular theory
9: Crossed products
10: Lp: ???? and Orlicz spaces for general von Neumann algebras
Part 4: Advanced Theory and Applications
11: Complex interpolation of noncommutative ???? spaces
12: Extensions of maps to ????(M) spaces and applications
13: Haagerup's reduction theorem
14: Applications to quantum physics
Bibliography
Notation Index
Subject Index
Este título pertence ao(s) assunto(s) indicados(s). Para ver outros títulos clique no assunto desejado.
