diff -r a60332c29d0b -r 408abd5ef0c7 text/a_inf_blob.tex
--- a/text/a_inf_blob.tex	Wed Feb 24 06:28:03 2010 +0000
+++ b/text/a_inf_blob.tex	Tue Mar 02 04:26:36 2010 +0000
@@ -295,6 +295,9 @@
 It is not hard to see that this defines a chain map from 
 $\cB^\cT(M)$ to $C_*(\Maps(M\to T))$.
 
+
+%%%%%%%%%%%%%%%%%
+\noop{
 Next we show that $g$ induces a surjection on homology.
 Fix $k > 0$ and choose an open cover $\cU$ of $M$ fine enough so that the union 
 of any $k$ open sets of $\cU$ is contained in a disjoint union of balls in $M$.
@@ -314,7 +317,7 @@
 It is now easy to see that $c$ is in the image of $g$.
 
 Next we show that $g$ is injective on homology.
-
+}