--- a/text/blobdef.tex	Wed Aug 18 21:05:50 2010 -0700
+++ b/text/blobdef.tex	Wed Aug 18 22:33:57 2010 -0700
@@ -236,6 +236,7 @@
 For $y \in \bc_*(X)$ with $y = \sum c_i b_i$ ($c_i$ a non-zero number, $b_i$ a blob diagram),
 we define $\supp(y) \deq \bigcup_i \supp(b_i)$.
 
+\begin{remark} \label{blobsset-remark} \rm
 We note that blob diagrams in $X$ have a structure similar to that of a simplicial set,
 but with simplices replaced by a more general class of combinatorial shapes.
 Let $P$ be the minimal set of (isomorphisms classes of) polyhedra which is closed under products
@@ -254,5 +255,5 @@
 (When the fields come from an $n$-category, this correspondence works best if we think of each twig label $u_i$ as having the form
 $x - s(e(x))$, where $x$ is an arbitrary field on $B_i$, $e: \cF(B_i) \to C$ is the evaluation map, 
 and $s:C \to \cF(B_i)$ is some fixed section of $e$.)
+\end{remark}
 
-