X-Git-Url: http://gitweb.michael.orlitzky.com/?p=mjotex.git;a=blobdiff_plain;f=examples.tex;h=c00279b16beb44514ae8e80e371d8dc3f8392a35;hp=af125a726265dbfd53b150bc42cca2cfeb5c3c6f;hb=17fd11a2ac39c8d20680a61279efed7bd18f93f2;hpb=42bef52e8272b97d0fae6243dd7621b793086e28

diff --git a/examples.tex b/examples.tex
index af125a7..c00279b 100644
--- a/examples.tex
+++ b/examples.tex
@@ -30,8 +30,12 @@
     is a multivariate polynomial ring with indeterminates $X$, $Y$,
     and $Z$, and coefficients in $R$. If $R$ is a moreover an integral
     domain, then its fraction field is $\Frac{R}$. If $x,y,z \in R$,
-    then $\ideal{\set{x,y,z}}$ is the ideal generated by $\set{x,y,z}$,
-    which is defined to be the smallest ideal in $R$ containing that set.
+    then $\ideal{\set{x,y,z}}$ is the ideal generated by
+    $\set{x,y,z}$, which is defined to be the smallest ideal in $R$
+    containing that set. Likewise, if we are in an algebra
+    $\mathcal{A}$ and if $x,y,z \in \mathcal{A}$, then
+    $\alg{\set{x,y,z}}$ is the smallest subalgebra of $\mathcal{A}$
+    containing the set $\set{x,y,z}$.
   \end{section}
 
   \begin{section}{Algorithm}