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
529c42b133cca6cf726e608c46d696cdbd62094e
Parent
578ea36b7c3595357cc7b3b3e91d315220aed5da
Author
Pablo <pablo-escobar@riseup.net>
Date

Fixed a typo

Diffstat

1 file changed, 1 insertion, 1 deletion

Status File Name N° Changes Insertions Deletions
Modified sections/simple-weight.tex 2 1 1
diff --git a/sections/simple-weight.tex b/sections/simple-weight.tex
@@ -1510,7 +1510,7 @@ Lo and behold\dots
   There exists a unique semisimple coherent extension \(\mExt(M)\) of \(M\).
   More precisely, if \(\mathcal{M}\) is any coherent extension of \(M\), then
   \(\mathcal{M}^{\operatorname{ss}} \cong \mExt(M)\). Furthermore, \(\mExt(M)\)
-  is a irreducible coherent family.
+  is an irreducible coherent family.
 \end{theorem}
 
 \begin{proof}