Cover of: Multiparticle quantum scattering in constant magnetic fields | Christian GГ©rard Read Online
Share

Multiparticle quantum scattering in constant magnetic fields

  • 487 Want to read
  • ·
  • 59 Currently reading

Published by American Mathematical Society in Providence, RI .
Written in English

Subjects:

  • Scattering (Physics),
  • Quantum theory,
  • Few-body problem,
  • Magnetic fields

Book details:

Edition Notes

Includes bibliographical references (p. 235-239) and index

StatementChristian Gérard, Izabella Łaba
SeriesMathematical surveys and monographs -- no. 90
ContributionsŁaba, Izabella, 1966-
Classifications
LC ClassificationsQC20.7.S3 G47 2001
The Physical Object
Paginationxiii, 242 p. ;
Number of Pages242
ID Numbers
Open LibraryOL15342433M
ISBN 10082182919X
LC Control Number2001053521

Download Multiparticle quantum scattering in constant magnetic fields

PDF EPUB FB2 MOBI RTF

Buy "Multiparticle Quantum Scattering with Applications to Nuclear, Atomic and Molecular Physics" (The IMA Volumes in Mathematics and its Applications) . Abstract. This article is an introduction to the spectral and scattering theory of Hamiltonians of quantum N-particle systems in a constant magnetic field, developed recently by C. Gérard and the such systems, both the effects due to the interactions between particles and those caused by the magnetic field play an important role, and it is the interplay between them that accounts Cited by: 1. This IMA Volume in Mathematics and its Applications MULTIPARTICLE QUANTUM SCATTERING WITH APPLICATIONS TO NUCLEAR, ATOMIC AND MOLECULAR PHYSICS is based on the proceedings of a workshop with the same title, which was an integral part of the IMA program on "Waves and Scattering." We would. Genre/Form: Electronic books: Additional Physical Format: Print version: Gérard, Christian, Multiparticle quantum scattering in constant magnetic fields.

Offers a mathematical treatment of the scattering theory of quantum N-particle systems in an external constant magnetic field. This work addresses the question of asymptotic completeness, a classification of possible trajectories of such systems according to their asymptotic behavior. Multiparticle Quantum Scattering in Constant Magnetic Fields Christian Gerard and Izabella Laba American Mathematical Society, Mathematical Surveys and Monographs, vol. 90, For more information about the published version, or to purchase a copy, go to the AMS bookstore. A vner Friedman Robert Gulliver v PREFACE The workshop on Multiparticle Quantum Scattering with Applications to Nuclear, Atomic, and Molecular Physics was held June , at the Institute for Mathematics and Its Applications in the University of Min­ nesota Twin Cities campus as part of the Program on Waves and Scattering. This article is an introduction to the spectral and scattering theory of Hamiltonians of quantum N-particle systems in a constant magnetic field, developed recently by C. Gérard and the author.

Neutron Scattering from Magnetic Materials is a comprehensive account of the present state of the art in the use of the neutron scattering for the study of magnetic materials. The chapters have been written by well-known researchers who are at the forefront of this field and have contributed directly to the development of the techniques described. Besides general properties, the book covers, in particular, multiparticle quantum mechanics including bound states of Coulomb systems and scattering theory, quantum mechanics in constant electric and magnetic fields, Schrödinger operators with random and almost periodic potentials and. and Multiparticle Quantum Scattering in Constant Magnetic Fields, Mathematical Surveys and Monographs, AMS The 2D Schrödinger equation for a neutral pair in a constant. Besides general properties, the book covers, in particular, multiparticle quantum mechanics including bound states of Coulomb systems and scattering theory, quantum mechanics in constant electric and magnetic fields, Schrödinger operators with random and almost periodic potentials and, finally, Schrödinger operator methods in differential.