Scattering Theory for Transport Phenomena: Mathematical Physics Studies
Autor Hassan Emamiraden Limba Engleză Hardback – 28 iun 2021
The scattering theory for transport phenomena was initiated by P. Lax and R. Phillips in 1967. Since then, great progress has been made in the field and the work has been ongoing for more than half a century. This book shows part of that progress.
The book is divided into 7 chapters, the first of which deals with preliminaries of the theory of semigroups and C*-algebra, different types of semigroups, Schatten–von Neuman classes of operators, and facts about ultraweak operator topology, with examples using wavelet theory.
In their seminal book, Lax and Phillips introduced the incoming and outgoing subspaces, which verify their representation theorem for a dissipative hyperbolic system initially and also matches for the transport problem. By means of these subspaces, the Lax and Phillips semigroup is defined and it is proved that this semigroup is eventually compact, hence hyperbolic.
Balanced equations give rise to two transport equations, one of which can satisfy an advection equation and one of which will be nonautonomous. For generating, the Howland semigroup and Howland’s formalism must be used, as shown in Chapter 5.
Chapter 6 is the highlight of the book, in which it is explained how the scattering operator for the transport problem by using the albedo operator can lead to recovery of the functionality of computerized tomography in medical science. The final chapter introduces the Wigner function, which connects the Schrödinger equation to statistical physics and the Husimi distribution function. Here, the relationship between the Wigner function and the quantum dynamical semigroup (QDS) can be seen.
| Toate formatele și edițiile | Preț | Express |
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| Paperback (1) | 695.27 lei 6-8 săpt. | |
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| Springer – 28 iun 2021 | 700.58 lei 6-8 săpt. |
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Specificații
ISBN-13: 9789811623721
ISBN-10: 9811623724
Pagini: 204
Ilustrații: XXI, 179 p. 6 illus.
Dimensiuni: 160 x 241 x 17 mm
Greutate: 0.48 kg
Ediția:1st ed. 2021
Editura: Springer
Seria Mathematical Physics Studies
Locul publicării:Singapore, Singapore
ISBN-10: 9811623724
Pagini: 204
Ilustrații: XXI, 179 p. 6 illus.
Dimensiuni: 160 x 241 x 17 mm
Greutate: 0.48 kg
Ediția:1st ed. 2021
Editura: Springer
Seria Mathematical Physics Studies
Locul publicării:Singapore, Singapore
Cuprins
Semigroups of Linear Operators.- Wave and Scattering Operators.- Existence of the Wave Operators for the Transport Equation.- The Lax and Phillips Formalism for the Transport Problems.- Scattering Theory for a Charged Particle Transport Problem.- Relationship between the Albedo and Scattering Operators.- Scattering Theory for Quantum Transport Equation.
Notă biografică
Textul de pe ultima copertă
The scattering theory for transport phenomena was initiated by P. Lax and R. Phillips in 1967. Since then, great progress has been made in the field and the work has been ongoing for more than half a century. This book shows part of that progress.
The book is divided into 7 chapters, the first of which deals with preliminaries of the theory of semigroups and C*-algebra, different types of semigroups, Schatten–von Neuman classes of operators, and facts about ultraweak operator topology, with examples using wavelet theory.
In their seminal book, Lax and Phillips introduced the incoming and outgoing subspaces, which verify their representation theorem for a dissipative hyperbolic system initially and also matches for the transport problem. By means of these subspaces, the Lax and Phillips semigroup is defined and it is proved that this semigroup is eventually compact, hence hyperbolic.
Balanced equations give rise to two transport equations, one of which can satisfy an advection equation and one of which will be nonautonomous. For generating, the Howland semigroup and Howland’s formalism must be used, as shown in Chapter 5.
Chapter 6 is the highlight of the book, in which it is explained how the scattering operator for the transport problem by using the albedo operator can lead to recovery of the functionality of computerized tomography in medical science. The final chapter introduces the Wigner function, which connects the Schrödinger equation to statistical physics and the Husimi distribution function. Here, the relationship between the Wigner function and the quantum dynamical semigroup (QDS) can be seen.
Caracteristici
Treats all aspect of the scattering theory for the transport problem Opens new research areas for further development Shows how a CT scanner works by using scattering formalism Opens many new aspects of the theory of the quantum dynamic semigroup and the Markovian dynamic