diff -r 8ed3aeb78778 -r 4a23163843a9 text/basic_properties.tex
--- a/text/basic_properties.tex	Fri Jul 30 18:36:08 2010 -0400
+++ b/text/basic_properties.tex	Fri Jul 30 20:19:17 2010 -0400
@@ -86,8 +86,8 @@
 Note that $S$ is a disjoint union of balls.
 Assign to $b$ the acyclic (in positive degrees) subcomplex $T(b) \deq r\bullet\bc_*(S)$.
 Note that if a diagram $b'$ is part of $\bd b$ then $T(B') \sub T(b)$.
-Both $f$ and the identity are compatible with $T$ (in the sense of acyclic models), 
-so $f$ and the identity map are homotopic. \nn{We should actually have a section \S \ref{sec:moam} with a definition of ``compatible" and this statement as a lemma}
+Both $f$ and the identity are compatible with $T$ (in the sense of acyclic models, \S\ref{sec:moam}), 
+so $f$ and the identity map are homotopic.
 \end{proof}
 
 For the next proposition we will temporarily restore $n$-manifold boundary