Spectral Analysis of Quantum Hamiltonians
Title | Spectral Analysis of Quantum Hamiltonians PDF eBook |
Author | Rafael Benguria |
Publisher | Springer Science & Business Media |
Pages | 341 |
Release | 2012-06-30 |
Genre | Mathematics |
ISBN | 3034804148 |
This volume contains surveys as well as research articles broadly centered on spectral analysis. Topics range from spectral continuity for magnetic and pseudodifferential operators to localization in random media, from the stability of matter to properties of Aharonov-Bohm and Quantum Hall Hamiltonians, from waveguides and resonances to supersymmetric models and dissipative fermion systems. This is the first of a series of volumes reporting every two years on recent progress in spectral theory.
Many-particle Hamiltonians
Title | Many-particle Hamiltonians PDF eBook |
Author | Robert Adolʹfovich Minlos |
Publisher | American Mathematical Soc. |
Pages | 194 |
Release | 1991 |
Genre | Hamiltonian systems |
ISBN | 9780821841044 |
This collection deals with several different topics related to the construction and spectral analysis of Hamiltonians of various systems arising in mathematical physics. Included are a study of the disposition and character of resonances for certain operators, with applications to solid body physics; a survey of work in the perturbation of Hamiltonians in fermion systems; an examination of the construction of the Hamiltonian for three different pointwise interacting quantum particles; and a study of the lower branches of the Hamiltonian of the lattice model for chromodynamics. The final paper presents an extensive survey of problems related to the spectrum of finite-particle lattice Hamiltonians, which arise in quantum field theory and in models in the theory of solid bodies. The book provides an introduction of sorts to a series of new methods and problems in mathematical physics.
Spectral Analysis of an Effective Hamiltonian in Nonrelativistic Quantum Electrodynamics
Title | Spectral Analysis of an Effective Hamiltonian in Nonrelativistic Quantum Electrodynamics PDF eBook |
Author | Asao Arai |
Publisher | |
Pages | |
Release | 2010 |
Genre | |
ISBN |
Non-Hermitian Hamiltonians in Quantum Physics
Title | Non-Hermitian Hamiltonians in Quantum Physics PDF eBook |
Author | Fabio Bagarello |
Publisher | Springer |
Pages | 0 |
Release | 2016-05-28 |
Genre | Science |
ISBN | 9783319313542 |
This book presents the Proceedings of the 15th International Conference on Non-Hermitian Hamiltonians in Quantum Physics, held in Palermo, Italy, from 18 to 23 May 2015. Non-Hermitian operators, and non-Hermitian Hamiltonians in particular, have recently received considerable attention from both the mathematics and physics communities. There has been a growing interest in non-Hermitian Hamiltonians in quantum physics since the discovery that PT-symmetric Hamiltonians can have a real spectrum and thus a physical relevance. The main subjects considered in this book include: PT-symmetry in quantum physics, PT-optics, Spectral singularities and spectral techniques, Indefinite-metric theories, Open quantum systems, Krein space methods, and Biorthogonal systems and applications. The book also provides a summary of recent advances in pseudo-Hermitian Hamiltonians and PT-symmetric Hamiltonians, as well as their applications in quantum physics and in the theory of open quantum systems.
Spectral Theory and Mathematical Physics
Title | Spectral Theory and Mathematical Physics PDF eBook |
Author | Pablo Miranda |
Publisher | Springer Nature |
Pages | 272 |
Release | 2020-11-12 |
Genre | Mathematics |
ISBN | 3030555569 |
This proceedings volume contains peer-reviewed, selected papers and surveys presented at the conference Spectral Theory and Mathematical Physics (STMP) 2018 which was held in Santiago, Chile, at the Pontifical Catholic University of Chile in December 2018. The original works gathered in this volume reveal the state of the art in the area and reflect the intense cooperation between young researchers in spectral theoryand mathematical physics and established specialists in this field. The list of topics covered includes: eigenvalues and resonances for quantum Hamiltonians; spectral shift function and quantum scattering; spectral properties of random operators; magnetic quantum Hamiltonians; microlocal analysis and its applications in mathematical physics. This volume can be of interest both to senior researchers and graduate students pursuing new research topics in Mathematical Physics.
Open Quantum Systems I
Title | Open Quantum Systems I PDF eBook |
Author | Stéphane Attal |
Publisher | Springer |
Pages | 347 |
Release | 2006-08-18 |
Genre | Mathematics |
ISBN | 3540339221 |
Understanding dissipative dynamics of open quantum systems remains a challenge in mathematical physics. This problem is relevant in various areas of fundamental and applied physics. Significant progress in the understanding of such systems has been made recently. These books present the mathematical theories involved in the modeling of such phenomena. They describe physically relevant models, develop their mathematical analysis and derive their physical implications.
C0-Groups, Commutator Methods and Spectral Theory of N-Body Hamiltonians
Title | C0-Groups, Commutator Methods and Spectral Theory of N-Body Hamiltonians PDF eBook |
Author | Werner Amrein |
Publisher | Springer Science & Business Media |
Pages | 473 |
Release | 2013-03-09 |
Genre | Mathematics |
ISBN | 3034877625 |
The relevance of commutator methods in spectral and scattering theory has been known for a long time, and numerous interesting results have been ob tained by such methods. The reader may find a description and references in the books by Putnam [Pu], Reed-Simon [RS] and Baumgartel-Wollenberg [BW] for example. A new point of view emerged around 1979 with the work of E. Mourre in which the method of locally conjugate operators was introduced. His idea proved to be remarkably fruitful in establishing detailed spectral properties of N-body Hamiltonians. A problem that was considered extremely difficult be fore that time, the proof of the absence of a singularly continuous spectrum for such operators, was then solved in a rather straightforward manner (by E. Mourre himself for N = 3 and by P. Perry, 1. Sigal and B. Simon for general N). The Mourre estimate, which is the main input of the method, also has consequences concerning the behaviour of N-body systems at large times. A deeper study of such propagation properties allowed 1. Sigal and A. Soffer in 1985 to prove existence and completeness of wave operators for N-body systems with short range interactions without implicit conditions on the potentials (for N = 3, similar results were obtained before by means of purely time-dependent methods by V. Enss and by K. Sinha, M. Krishna and P. Muthuramalingam). Our interest in commutator methods was raised by the major achievements mentioned above.