- Commit
- 0cde29f05c4abbc5f69b5c318d86c1a6d8ae56a9
- Parent
- 02ff7321bcae84e4056fc4e8f275d8b6c9c94b56
- Author
- Pablo <pablo-escobar@riseup.net>
- Date
Changed the title of the introduction
lie-algebras-and-their-representations
Source code for my notes on representations of semisimple Lie algebras and Olivier Mathieu's classification of simple weight modules
Diffstat
1 file changed, 2 insertions, 2 deletions
| Status | File Name | N° Changes | Insertions | Deletions |
| Modified | sections/introduction.tex | 4 | 2 | 2 |
diff --git a/sections/introduction.tex b/sections/introduction.tex @@ -1,4 +1,4 @@ -\chapter{Lie Algebras} +\chapter{Introduction} Associative algebras have proven themselves remarkably useful throughout mathematics. There's no lack of natural and interesting examples coming from a @@ -272,7 +272,7 @@ Having thus hopefully established Lie algebras are interesting, we are now ready to dive deeper into them. We begin by analyzing some of their most basic properties. -\section{Basic Structure of Lie Algebras} +\section{Lie Algebras} However bizarre Lie algebras may seem at a first glance, they actually share a lot a structural features with their associative counterparts. For instance, it