--- a/text/evmap.tex Tue Sep 21 14:44:17 2010 -0700
+++ b/text/evmap.tex Tue Sep 21 17:28:14 2010 -0700
@@ -415,7 +415,7 @@
(For convenience, we will permit the singular cells generating $CH_*(X, Y)$ to be more general
than simplices --- they can be based on any cone-product polyhedron (see Remark \ref{blobsset-remark}).)
-\begin{thm} \label{thm:CH}
+\begin{thm} \label{thm:CH} \label{thm:evaluation}%
For $n$-manifolds $X$ and $Y$ there is a chain map
\eq{
e_{XY} : CH_*(X, Y) \otimes \bc_*(X) \to \bc_*(Y) ,
@@ -424,7 +424,7 @@
such that
\begin{enumerate}
\item on $CH_0(X, Y) \otimes \bc_*(X)$ it agrees with the obvious action of
-$\Homeo(X, Y)$ on $\bc_*(X)$ described in Property (\ref{property:functoriality}), and
+$\Homeo(X, Y)$ on $\bc_*(X)$ described in Property \ref{property:functoriality}, and
\item for any compatible splittings $X\to X\sgl$ and $Y\to Y\sgl$,
the following diagram commutes up to homotopy
\begin{equation*}