diff -r f40f726d6cca -r 16ec4ad5c618 text/tqftreview.tex
--- a/text/tqftreview.tex	Wed Jun 29 12:02:47 2011 -0700
+++ b/text/tqftreview.tex	Wed Jun 29 12:37:55 2011 -0700
@@ -368,7 +368,7 @@
 Local relations are subspaces $U(B; c)\sub \cC(B; c)$ of the fields on balls which form an ideal under gluing.
 Again, we give the examples first.
 
-\addtocounter{prop}{-2}
+\addtocounter{subsection}{-2}
 \begin{example}[contd.]
 For maps into spaces, $U(B; c)$ is generated by fields of the form $a-b \in \lf(B; c)$,
 where $a$ and $b$ are maps (fields) which are homotopic rel boundary.
@@ -379,6 +379,8 @@
 $\lf(B; c) \to \mor(c', c'')$, where $(c', c'')$ is some (any) division of $c$ into
 domain and range.
 \end{example}
+\addtocounter{subsection}{2}
+\addtocounter{prop}{-2}
 
 These motivate the following definition.