--- a/text/ncat.tex	Fri May 06 17:24:08 2011 -0700
+++ b/text/ncat.tex	Fri May 06 17:46:07 2011 -0700
@@ -1025,6 +1025,10 @@
 Roughly, a permissible decomposition is like a ball decomposition where we don't care in which order the balls
 are glued up to yield $W$, so long as there is some (non-pathological) way to glue them.
 
+(Every smooth or PL manifold has a ball decomposition, but certain topological manifolds (e.g.\ non-smoothable
+topological 4-manifolds) do nat have ball decompositions.
+For such manifolds we have only the empty colimit.) 
+
 Given permissible decompositions $x = \{X_a\}$ and $y = \{Y_b\}$ of $W$, we say that $x$ is a refinement
 of $y$, or write $x \le y$, if there is a ball decomposition $\du_a X_a = M_0\to\cdots\to M_m = W$
 with $\du_b Y_b = M_i$ for some $i$,