Introduction: Atomic Physics and Nuclear Properties; J. Bauche. Atomic Methods in Nuclear Spectroscopy: Progress in Atomic Physics Experiments on Nuclear Properties; R. Neugart. Single Particle Aspects: Single Particle Response Function; S. Gales. Multiphonon States: Low-Energy Multiphonon States in Deformed Nuclei; R. Piepenbring. Shapes and Coexistence: Algebraic Approaches to Nuclear Structure; R.F. Casten. Octupoles: Reflection-Asymmetric Shapes in Atomic Nuclei; W. Nazarewicz. Superdeformation: Microscopic Description of Superdeformation at Low Spin; R. Bonche, et al. Exotic Nuclei: Search for New Radioactivities at the Proton-Drip Line; F. Pougheon, et al. Chaos: Quantum Chaos and Low-Energy Nuclear Spectroscopy; M.J. Giannoni. Experimental Techniques: Nuclear Moments by Orientation Methods; H. Postma. 35 additional articles. Index.

Ever since its introduction around 1960 by Kirillov, the orbit method has played a major role in representation theory of Lie groups and Lie algebras. This book contains the proceedings of a conference held from August 29 to September 2, 1988, at the University of Copenhagen, about "the orbit method in representation theory." It contains ten articles, most of which are original research papers, by well-known mathematicians in the field, and it reflects the fact that the orbit method plays an important role in the representation theory of semisimple Lie groups, solvable Lie groups, and even more general Lie groups, and also in the theory of enveloping algebras.

For more than five decades Bertram Kostant has been one of the major architects of modern Lie theory. Virtually all his papers are pioneering with deep consequences, many giving rise to whole new fields of activities. His interests span a tremendous range of Lie theory, from differential geometry to representation theory, abstract algebra, and mathematical physics. It is striking to note that Lie theory (and symmetry in general) now occupies an ever increasing larger role in mathematics than it did in the fifties. Now in the sixth decade of his career, he continues to produce results of astonishing beauty and significance for which he is invited to lecture all over the world. This is the fourth volume (1985-1995) of a five-volume set of Bertram Kostant's collected papers. A distinguished feature of this fourth volume is Kostant's commentaries and summaries of his papers in his own words.

For more than five decades Bertram Kostant has been one of the major architects of modern Lie theory. Virtually all his papers are pioneering with deep consequences, many giving rise to whole new fields of activities. His interests span a tremendous range of Lie theory, from differential geometry to representation theory, abstract algebra, and mathematical physics. It is striking to note that Lie theory (and symmetry in general) now occupies an ever increasing larger role in mathematics than it did in the fifties. Now in the sixth decade of his career, he continues to produce results of astonishing beauty and significance for which he is invited to lecture all over the world. This is the third volume (1975-1985) of a five-volume set of Bertram Kostant's collected papers. A distinguished feature of this third volume is Kostant's commentaries and summaries of his papers in his own words.

For more than five decades Bertram Kostant has been one of the major architects of modern Lie theory. Virtually all his papers are pioneering with deep consequences, many giving rise to whole new fields of activities. His interests span a tremendous range of Lie theory, from differential geometry to representation theory, abstract algebra, and mathematical physics. It is striking to note that Lie theory (and symmetry in general) now occupies an ever increasing larger role in mathematics than it did in the fifties. Now in the sixth decade of his career, he continues to produce results of astonishing beauty and significance for which he is invited to lecture all over the world. This is the fifth volume (1995-2005) of a five-volume set of Bertram Kostant's collected papers. A distinguished feature of this fifth volume is Kostant's commentaries and summaries of his papers in his own words.

For more than five decades Bertram Kostant has been one of the major architects of modern Lie theory. Virtually all his papers are pioneering with deep consequences, many giving rise to whole new fields of activities. His interests span a tremendous range of Lie theory, from differential geometry to representation theory, abstract algebra, and mathematical physics. It is striking to note that Lie theory (and symmetry in general) now occupies an ever increasing larger role in mathematics than it did in the fifties. Now in the sixth decade of his career, he continues to produce results of astonishing beauty and significance for which he is invited to lecture all over the world. This is the second volume (1965-1975) of a five-volume set of Bertram Kostant's collected papers. A distinguished feature of this second volume is Kostant's commentaries and summaries of his papers in his own words.

Dedicated to Jacques Carmona, an expert in noncommutative harmonic analysis, the volume presents excellent invited/refereed articles by top notch mathematicians. Topics cover general Lie theory, reductive Lie groups, harmonic analysis and the Langlands program, automorphic forms, and Kontsevich quantization. Good text for researchers and grad students in representation theory.

The present NATO Advanced Research Workshop held in Cargese (Corsica) from June 3rd to June 7th, 1991, was devoted to Nuclear Shapes and Nuclear Structure at Low Excitation Energies. We tried to organize the Workshop to facilitate the exchange of information in a rapidly moving field, where theorists and experimentalists are continuously developing and implementing new and powerful techniques in order, both to improve our knowledge and understanding of already known areas and to open completely new and fascinating frontier domains, as for example in the case of the recent discovery of Superdeformations. The informal atmosphere of Cargese contributed to easy contacts and scientific exchanges and to relaxed - although fruitful and sometimes passionate - discussions. We would like to express our gratitude to NATO for its financial support which made this Workshop possible. We acknowledge the support of the Institut de Physique Nucleaire et de Physique des Particules (France), the Commissariat a l'Energie Atomique (France), and the Centre National de la Recherche Scientifique - Mathematiques et Physique de Base (France). Our special appreciation is due to Frederique Dykstra and Josepha Nsair for their outstanding organizational work throughout the preparation and duration of this conference. We want to acknowledge at this occasion the help of many people from the departments of the Institut de Physique Nucleaire of Orsay. It is also a pleasure to thank the Universite de Nice for making available the facilities of the Cargese Scientific Institute.

Dedicated to Jacques Carmona, an expert in noncommutative harmonic analysis, the volume presents excellent invited/refereed articles by top notch mathematicians. Topics cover general Lie theory, reductive Lie groups, harmonic analysis and the Langlands program, automorphic forms, and Kontsevich quantization. Good text for researchers and grad students in representation theory.

Ever since its introduction around 1960 by Kirillov, the orbit method has played a major role in representation theory of Lie groups and Lie algebras. This book contains the proceedings of a conference held from August 29 to September 2, 1988, at the University of Copenhagen, about "the orbit method in representation theory." It contains ten articles, most of which are original research papers, by well-known mathematicians in the field, and it reflects the fact that the orbit method plays an important role in the representation theory of semisimple Lie groups, solvable Lie groups, and even more general Lie groups, and also in the theory of enveloping algebras.

Generalized non convulsive epilepsy (GNCE), also called absence or petit mal epilepsy, is a disease appearing during childhood. EEG, clinical, pharmacological and genetic characteristics differ from those of convulsive or focal epilepsies. No underlying structural or biochemical abnormality has been identified for generalized absence seizures and the etiology of this disorder is unknown. It is unlikely that the precise pathophysiology of GNCE can be resolved in studies that focus on humans. Therefore a number of animal models reproducing the human disease have been developed. The aim of this supplementum is to characterize such models in rodents. First, recent models are extensively described. These include the genetic model of spontaneous GNCE in Strasbourg's Wistar rats and in tottering mice as well as bilateral spike and wave discharges induced by GHB, PTZ or GABA mimetics. Second, this supplementum will also provide very recent information on putative mechanisms underlying generalized absence seizures. Third, various experimental approaches aimed at investigating the neural substrate of this particular kind of epilepsy are described with various electrophysiological, pharmacological, biochemical, metabolic, ionic and molecular data. This supplementum provides an original multidisciplinary approach to the mechanisms involved in GNCE and demonstrates that rodent models are a promising tool which complements the classical feline penicillin model.

All the papers in this volume are research papers presenting new results. Most of the results concern semi-simple Lie groups and non-Riemannian symmetric spaces: unitarisation, discrete series characters, multiplicities, orbital integrals. Some, however, also apply to related fields such as Dirac operators and characters in the general case.