A TOUR OF REPRESENTATION THEORY

A TOUR OF REPRESENTATION THEORY

Editorial:
AMS (AMERICAN MATHEMATICAL SOCIETY)
Año de edición:
Materia
Matematicas
ISBN:
978-1-4704-3680-3
Páginas:
654
N. de edición:
1
Idioma:
Inglés
Disponibilidad:
Disponible en 2-3 semanas

Descuento:

-5%

Antes:

110,00 €

Despues:

104,50 €

Algebras: Representations of algebras
Further topics on algebras
Groups: Groups and group algebras
Symmetric groups
Lie algebras: Lie algebras and enveloping algebras
Semisimple Lie algebras
Root systems
Representations of semisimple Lie algebras
Hopf algebras: Coalgebras, bialgebras, and Hopf algebras
Representations and actions
Affine algebraic groups
Finite-dimensional Hopf algebras
Appendices: The language of categories and functors
Background from linear algebra
Some commutative algebra
The Diamond Lemma
The symmetric ring of quotients
Bibliography
Subject index
Index of names
Notation.

Representation theory investigates the different ways in which a given algebraic object--such as a group or a Lie algebra--can act on a vector space. Besides being a subject of great intrinsic beauty, the theory enjoys the additional benefit of having applications in myriad contexts outside pure mathematics, including quantum field theory and the study of molecules in chemistry.

Adopting a panoramic viewpoint, this book offers an introduction to four different flavors of representation theory: representations of algebras, groups, Lie algebras, and Hopf algebras. A separate part of the book is devoted to each of these areas and they are all treated in sufficient depth to enable and hopefully entice the reader to pursue research in representation theory. The book is intended as a textbook for a course on representation theory, which could immediately follow the standard graduate abstract algebra course, and for subsequent more advanced reading courses. Therefore, more than 350 exercises at various levels of difficulty are included. The broad range of topics covered will also make the text a valuable reference for researchers in algebra and related areas and a source for graduate and postgraduate students wishing to learn more about representation theory by self-study.