diff -r 1bb33e217a5a -r f58d590e8a08 text/appendixes/smallblobs.tex
--- a/text/appendixes/smallblobs.tex	Thu Jun 24 10:17:19 2010 -0400
+++ b/text/appendixes/smallblobs.tex	Thu Jun 24 14:20:38 2010 -0400
@@ -15,15 +15,9 @@
 We can't quite do the same with all $\cV_k$ just equal to $\cU$, but we can get by if we give ourselves arbitrarily little room to maneuver, by making the blobs we act on slightly smaller.
 \end{rem}
 \begin{proof}
-This follows from the remark \nn{number it and cite it?} following the proof of 
+This follows from Remark \ref{rem:for-small-blobs} following the proof of 
 Proposition \ref{CHprop}.
 \end{proof}
-\noop{
-We choose yet another open cover, $\cW$, which so fine that the union (disjoint or not) of any one open set $V \in \cV$ with $k$ open sets $W_i \in \cW$ is contained in a disjoint union of open sets of $\cU$.
-Now, in the proof of Proposition \ref{CHprop}
-[...]
-}
-
 
 \begin{proof}[Proof of Theorem \ref{thm:small-blobs}]
 We begin by describing the homotopy inverse in small degrees, to illustrate the general technique.