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

Commit: e2decc859f5de4d47a28679bbcb3235342276a40
Parent: 6b87d44603edf27037071443fc455f58b5a0995a
Author: Pablo <pablo-escobar@riseup.net>
Date: Sat, 26 Nov 2022 11:08:57 +0000

Fixed a typo

Diffstat

1 file changed, 1 insertion, 1 deletion

Status	File Name	N° Changes	Insertions	Deletions
Modified	sections/complete-reducibility.tex	2	1	1

diff --git a/sections/complete-reducibility.tex b/sections/complete-reducibility.tex
@@ -24,7 +24,7 @@ of any old Lie algebra?
 
 We will get back to this question in a moment, but for now we simply note that,
 when solving a classification problem, it is often profitable to break down our
-structure is smaller peaces. This leads us to the following definitions.
+structure is smaller pieces. This leads us to the following definitions.
 
 \begin{definition}
   A representation of \(\mathfrak{g}\) is called \emph{indecomposable} if it is