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Representation Theory and Complex Geometry [recurso electrónico] / by Neil Chriss, Victor Ginzburg.

Por: Chriss, Neil [author.]Colaborador(es): Ginzburg, Victor [author.] | SpringerLink (Online service)Tipo de material: Texto

TextoSeries Modern Birkhäuser ClassicsEditor: Boston : Birkhäuser Boston, 2010Edición: 1stDescripción: X, 495p. 10 illus., 5 illus. in color. online resourceTipo de contenido: text Tipo de medio: computer Tipo de portador: online resourceISBN: 9780817649388Tema(s): Mathematics | Geometry, algebraic | Topological Groups | Cell aggregation -- Mathematics | Mathematics | Topological Groups, Lie Groups | Algebraic Geometry | Manifolds and Cell Complexes (incl. Diff.Topology) | Theoretical, Mathematical and Computational PhysicsFormatos físicos adicionales: Printed edition:: Sin títuloClasificación CDD: 512.55 | 512.482 Clasificación LoC:QA252.3QA387Recursos en línea: Libro electrónico Texto

Contenidos:

Symplectic Geometry -- Mosaic -- Complex Semisimple Groups -- Springer Theory for (sl) -- Equivariant K-Theory -- Flag Varieties, K-Theory, and Harmonic Polynomials -- Hecke Algebras and K–Theory -- Representations of Convolution Algebras.

En: Springer eBooksResumen: This classic monograph provides an overview of modern advances in representation theory from a geometric standpoint. A geometrically-oriented treatment of the subject is very timely and has long been desired, especially since the discovery of D-modules in the early 1980s and the quiver approach to quantum groups in the early 1990s. The techniques developed are quite general and can be successfully applied to other areas such as quantum groups, affine Lie groups, and quantum field theory. The first half of the book fills the gap between the standard knowledge of a beginner in Lie theory and the much wider background needed by the working mathematician. The book is largely self-contained. . . . There is a nice introduction to symplectic geometry and a charming exposition of equivariant K-theory. Both are enlivened by examples related to groups. . . . An attractive feature is the attempt to convey some informal 'wisdom' rather than only the precise definitions. As a number of results is due to the authors, one finds some of the original excitement. This is the only available introduction to geometric representation theory. . . it has already proved successful in introducing a new generation to the subject. --- Bulletin of the American Mathematical Society The authors have tried to help readers by adopting an informal and easily accessible style. . . . The book will provide a guide to those who wish to penetrate into subject-matter which, so far, was only accessible in difficult papers. . . . The book is quite suitable as a basis for an advanced course or a seminar, devoted to the material of one of the chapters of the book. --- Mededelingen van het Wiskundig Genootschap Represents an important and very interesting addition to the literature. --- Mathematical Reviews

Existencias ( 1 )
Notas de título ( 3 )

Existencias
Tipo de ítem	Biblioteca actual	Colección	Signatura	Copia número	Estado	Fecha de vencimiento	Código de barras
Libro Electrónico	Biblioteca Electrónica	Colección de Libros Electrónicos	QA252.3 (Browse shelf(Abre debajo))	1	No para préstamo		370424-2001

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Previo	QA252.3 Applications of Symmetry Methods to Partial Differential Equations	QA252.3 Higher Structures in Geometry and Physics	QA252.3 Developments and Trends in Infinite-Dimensional Lie Theory	QA252.3 Representation Theory and Complex Geometry	QA252.3 Spinors in Four-Dimensional Spaces	QA252.3 Reflections on Quanta, Symmetries, and Supersymmetries	QA252.3 Theory of Group Representations and Fourier Analysis	Siguiente

This classic monograph provides an overview of modern advances in representation theory from a geometric standpoint. A geometrically-oriented treatment of the subject is very timely and has long been desired, especially since the discovery of D-modules in the early 1980s and the quiver approach to quantum groups in the early 1990s. The techniques developed are quite general and can be successfully applied to other areas such as quantum groups, affine Lie groups, and quantum field theory. The first half of the book fills the gap between the standard knowledge of a beginner in Lie theory and the much wider background needed by the working mathematician. The book is largely self-contained. . . . There is a nice introduction to symplectic geometry and a charming exposition of equivariant K-theory. Both are enlivened by examples related to groups. . . . An attractive feature is the attempt to convey some informal 'wisdom' rather than only the precise definitions. As a number of results is due to the authors, one finds some of the original excitement. This is the only available introduction to geometric representation theory. . . it has already proved successful in introducing a new generation to the subject. --- Bulletin of the American Mathematical Society The authors have tried to help readers by adopting an informal and easily accessible style. . . . The book will provide a guide to those who wish to penetrate into subject-matter which, so far, was only accessible in difficult papers. . . . The book is quite suitable as a basis for an advanced course or a seminar, devoted to the material of one of the chapters of the book. --- Mededelingen van het Wiskundig Genootschap Represents an important and very interesting addition to the literature. --- Mathematical Reviews