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Multi-scale Analysis for Random Quantum Systems with Interaction (Progress in Mathematical Physics, nr. 65)

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en Limba Engleză Carte Hardback – 20 Sep 2013
The study of quantum disorder has generated considerable research activity in mathematics and physics over past 40 years. While single-particle models have been extensively studied at a rigorous mathematical level, little was known about systems of several interacting particles, let alone systems with positive spatial particle density. Creating a consistent theory of disorder in multi-particle quantum systems is an important and challenging problem that largely remains open. Multi-scale Analysis for Random Quantum Systems with Interaction  presents the progress that had been recently achieved in this area.
 
The main focus of the book is on a rigorous derivation of the multi-particle localization in a strong random external potential field. To make the presentation accessible to a wider audience, the authors restrict attention to a relatively simple tight-binding Anderson model on a cubic lattice Zd.
 
This book includes the following cutting-edge features:
 
an introduction to the state-of-the-art single-particle localization theory
an extensive discussion of relevant technical aspects of the localization theory
a thorough comparison of the multi-particle model with its single-particle counterpart
a self-contained rigorous derivation of both spectral and dynamical localization in the multi-particle tight-binding Anderson model.
 
Required mathematical background for the book includes a knowledge of functional calculus, spectral theory (essentially reduced to the case of finite matrices) and basic probability theory. This is an excellent text for a year-long graduate course or seminar in mathematical physics. It also can serve as a standard reference for specialists.
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Specificații

ISBN-13: 9781461482253
ISBN-10: 1461482259
Pagini: 226
Ilustrații: XI, 238 p. 5 illus., 5 schwarz-weiße Abbildungen
Dimensiuni: 155 x 235 x 20 mm
Greutate: 0.52 kg
Ediția: 2014
Editura: Springer
Colecția Birkhäuser
Seria Progress in Mathematical Physics

Locul publicării: New York, NY, United States

Public țintă

Research

Cuprins

Preface.- Part I Single-particle Localisation.- A Brief History of Anderson Localization.- Single-Particle MSA Techniques.- Part II Multi-particle Localization.- Multi-particle Eigenvalue Concentration Bounds.- Multi-particle MSA Techniques.- References.- Index.

Textul de pe ultima copertă

The study of quantum disorder has generated considerable research activity in mathematics and physics over past 40 years. While single-particle models have been extensively studied at a rigorous mathematical level, little was known about systems of several interacting particles, let alone systems with positive spatial particle density. Creating a consistent theory of disorder in multi-particle quantum systems is an important and challenging problem that largely remains open. Multi-scale Analysis for Random Quantum Systems with Interaction  presents the progress that had been recently achieved in this area.
 
The main focus of the book is on a rigorous derivation of the multi-particle localization in a strong random external potential field. To make the presentation accessible to a wider audience, the authors restrict attention to a relatively simple tight-binding Anderson model on a cubic lattice Zd.
 
This book includes the following cutting-edge features:
* an introduction to the state-of-the-art single-particle localization theory
* an extensive discussion of relevant technical aspects of the localization theory
* a thorough comparison of the multi-particle model with its single-particle counterpart
* a self-contained rigorous derivation of both spectral and dynamical localization in the multi-particle tight-binding Anderson model.
 
Required mathematical background for the book includes a knowledge of functional calculus, spectral theory (essentially reduced to the case of finite matrices) and basic probability theory. This is an excellent text for a year-long graduate course or seminar in mathematical physics. It also can serve as a standard reference for specialists.

Caracteristici

Introduces the reader to recent progress in this field
Attracts attention to possible directions for future research
Presents new and exciting research the first time in the literature and includes all necessary background material