Combinatorics of Minuscule Representations
Combinatorics of Minuscule Representations
$151.00
USDMinuscule representations occur in a variety of contexts in mathematics and physics. They are typically much easier to understand than representations in general, which means they give rise to relatively easy constructions of algebraic objects such as Lie algebras and Weyl groups. This book describes a combinatorial approach to minuscule representations of Lie algebras using the theory of heaps, which for most practical purposes can be thought of as certain labelled partially ordered sets. This leads to uniform constructions of (most) simple Lie algebras over the complex numbers and their associated Weyl groups, and provides a common framework for various applications. The topics studied include Chevalley bases, permutation groups, weight polytopes and finite geometries. Ideal as a reference, this book is also suitable for students with a background in linear and abstract algebra and topology. Each chapter concludes with historical notes, references to the literature and suggestions for further reading.
- The author's example-driven combinatorial approach makes explicit calculations easy
- Discusses many applications in detail
- Includes numerous exercises and hints to solutions
Reviews & endorsements
"This monograph could be read with profit not only by the specialist, but also by an interested graduate student with some background on Lie algebras."
Felipe Zaldivar, MAA Reviews
"The exposition [is] very clear. The book is strongly recommended to students and researchers who are interested in combinatorial aspects of representation theory."
Hiro-Fumi Yamada, Mathematical Reviews
"… useful as a book for students, the book under review is particularly useful as a reference for researchers of relevant fields."
Qendrim R. Gashi, Zentralblatt MATH
Product details
January 2013Adobe eBook Reader
9781107302709
0 pages
0kg
70 b/w illus. 7 tables 275 exercises
This ISBN is for an eBook version which is distributed on our behalf by a third party.
Table of Contents
- Introduction
- 1. Classical Lie algebras and Weyl groups
- 2. Heaps over graphs
- 3. Weyl group actions
- 4. Lie theory
- 5. Minuscule representations
- 6. Full heaps over affine Dynkin diagrams
- 7. Chevalley bases
- 8. Combinatorics of Weyl groups
- 9. The 28 bitangents
- 10. Exceptional structures
- 11. Further topics
- Appendix A. Posets, graphs and categories
- Appendix B. Lie theoretic data
- References
- Index.
