--- a/text/deligne.tex	Sun Jul 11 14:31:56 2010 -0600
+++ b/text/deligne.tex	Sun Jul 11 14:38:48 2010 -0600
@@ -44,7 +44,7 @@
 We emphasize that in $\hom(\bc^C_*(I), \bc^C_*(I))$ we are thinking of $\bc^C_*(I)$ as a module
 for the $A_\infty$ 1-category associated to $\bd I$, and $\hom$ means the 
 morphisms of such modules as defined in 
-Subsection \ref{ss:module-morphisms}.
+\S\ref{ss:module-morphisms}.
 
 We can think of a fat graph as encoding a sequence of surgeries, starting at the bottommost interval
 of Figure \ref{delfig1} and ending at the topmost interval.
@@ -215,7 +215,7 @@
 \]
 which satisfy the operad compatibility conditions.
 On $C_0(FG^n_{\ol{M}\ol{N}})$ this agrees with the chain map $p$ defined above.
-When $k=0$, this coincides with the $C_*(\Homeo(M_0\to N_0))$ action of Section \ref{sec:evaluation}.
+When $k=0$, this coincides with the $C_*(\Homeo(M_0\to N_0))$ action of \S\ref{sec:evaluation}.
 \end{thm}
 
 If, in analogy to Hochschild cochains, we define elements of $\hom(M, N)$