Author : Gerard Lion
Publisher : Springer Science & Business Media
Page : 341 pages
File Size : 30,45 MB
Release : 2013-11-11
Category : Mathematics
ISBN : 1468491547
This is a collection of research-oriented monographs, reports, and notes arising from lectures and seminars on the Weil representation, the Maslov index, and the Theta series. It is good contribution to the international scientific community, particularly for researchers and graduate students in the field.
Author : Gerard Lion
Publisher :
Page : 348 pages
File Size : 25,19 MB
Release : 2014-01-15
Category :
ISBN : 9781468491555
Author : Daniele Alessandrini
Publisher : American Mathematical Society
Page : 130 pages
File Size : 12,19 MB
Release : 2024-09-09
Category : Mathematics
ISBN : 1470471086
View the abstract.
Author : Palle E.T. Jorgensen
Publisher : Courier Dover Publications
Page : 307 pages
File Size : 49,66 MB
Release : 2017-05-22
Category : Science
ISBN : 0486822575
Three-part treatment covers background material on definitions, terminology, operators in Hilbert space domains of representations, operators in the enveloping algebra, spectral theory; and covariant representation and connections. 2017 edition.
Author : Naum I︠A︡kovlevich Vilenkin
Publisher : Springer Science & Business Media
Page : 670 pages
File Size : 24,77 MB
Release : 1992-09-30
Category : Mathematics
ISBN : 9780792314936
This is the last of three major volumes which present a comprehensive treatment of the theory of the main classes of special functions from the point of view of the theory of group representations. This volume deals with q-analogs of special functions, quantum groups and algebras (including Hopf algebras), and (representations of) semi-simple Lie groups. Also treated are special functions of a matrix argument, representations in the Gel'fand-Tsetlin basis, and, finally, modular forms, theta-functions and affine Lie algebras. The volume builds upon results of the previous two volumes, and presents many new results. Subscribers to the complete set of three volumes will be entitled to a discount of 15%.
Author : Paul Fong
Publisher : American Mathematical Soc.
Page : 562 pages
File Size : 25,2 MB
Release : 1987
Category : Mathematics
ISBN : 0821814788
The papers in these proceedings of the 1986 Arcata Summer Institute bear witness to the extraordinarily vital and intense research in the representation theory of finite groups. The confluence of diverse mathematical disciplines has brought forth work of great scope and depth. Particularly striking is the influence of algebraic geometry and cohomology theory in the modular representation theory and the character theory of reductive groups over finite fields, and in the general modular representation theory of finite groups. The continuing developments in block theory and the general character theory of finite groups is noteworthy. The expository and research aspects of the Summer Institute are well represented by these papers.
Author : N.Ja. Vilenkin
Publisher : Springer Science & Business Media
Page : 629 pages
File Size : 34,79 MB
Release : 2013-03-14
Category : Mathematics
ISBN : 9401728836
This is the second of three major volumes which present a comprehensive treatment of the theory of the main classes of special functions from the point of view of the theory of group representations. This volume deals with the properties of special functions and orthogonal polynomials (Legendre, Gegenbauer, Jacobi, Laguerre, Bessel and others) which are related to the class 1 representations of various groups. The tree method for the construction of bases for representation spaces is given. `Continuous' bases in the spaces of functions on hyperboloids and cones and corresponding Poisson kernels are found. Also considered are the properties of the q-analogs of classical orthogonal polynomials, related to representations of the Chevalley groups and of special functions connected with fields of p-adic numbers. Much of the material included appears in book form for the first time and many of the topics are presented in a novel way. This volume will be of great interest to specialists in group representations, special functions, differential equations with partial derivatives and harmonic anlysis. Subscribers to the complete set of three volumes will be entitled to a discount of 15%.
Author : Maurice A De Gosson
Publisher : World Scientific
Page : 423 pages
File Size : 22,48 MB
Release : 2016-11-10
Category : Science
ISBN : 9813200987
The second edition of this book deals, as the first, with the foundations of classical physics from the 'symplectic' point of view, and of quantum mechanics from the 'metaplectic' point of view. We have revised and augmented the topics studied in the first edition in the light of new results, and added several new sections. The Bohmian interpretation of quantum mechanics is discussed in detail. Phase space quantization is achieved using the 'principle of the symplectic camel', which is a deep topological property of Hamiltonian flows. We introduce the notion of 'quantum blob', which can be viewed as the fundamental phase space unit. The mathematical tools developed in this book are the theory of the symplectic and metaplectic group, the Maslov index in a rigorous form, and the Leray index of a pair of Lagrangian planes. The concept of the 'metatron' is introduced, in connection with the Bohmian theory of motion. The short-time behavior of the propagator is studied and applied to the quantum Zeno effect.
Author : J. Donald Monk
Publisher : Springer Science & Business Media
Page : 308 pages
File Size : 13,57 MB
Release : 2010-03-25
Category : Mathematics
ISBN : 3034603347
This text covers cardinal number valued functions defined for any Boolean algebra such as cellularity. It explores the behavior of these functions under algebraic operations such as products, free products, ultraproducts and their relationships to each other.
Author : Werner Amrein
Publisher : Springer Science & Business Media
Page : 473 pages
File Size : 15,85 MB
Release : 2013-03-09
Category : 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.
