--- a/text/a_inf_blob.tex Wed Sep 15 13:33:47 2010 -0500
+++ b/text/a_inf_blob.tex Sun Sep 19 22:29:29 2010 -0500
@@ -10,7 +10,7 @@
that when $\cC$ is obtained from a system of fields $\cD$
as the blob complex of an $n$-ball (see Example \ref{ex:blob-complexes-of-balls}),
$\cl{\cC}(M)$ is homotopy equivalent to
-our original definition of the blob complex $\bc_*^\cD(M)$.
+our original definition of the blob complex $\bc_*(M;\cD)$.
%\medskip
@@ -33,7 +33,7 @@
Given a system of fields $\cE$ and a $n{-}k$-manifold $F$, recall from
Example \ref{ex:blob-complexes-of-balls} that there is an $A_\infty$ $k$-category $\cC_F$
defined by $\cC_F(X) = \cE(X\times F)$ if $\dim(X) < k$ and
-$\cC_F(X) = \bc_*^\cE(X\times F)$ if $\dim(X) = k$.
+$\cC_F(X) = \bc_*(X\times F;\cE)$ if $\dim(X) = k$.
\begin{thm} \label{thm:product}
--- a/text/deligne.tex Wed Sep 15 13:33:47 2010 -0500
+++ b/text/deligne.tex Sun Sep 19 22:29:29 2010 -0500
@@ -107,7 +107,7 @@
(See Figure \ref{xdfig3}.)
\begin{figure}[t]
$$\mathfig{.4}{deligne/dfig3a} \to \mathfig{.4}{deligne/dfig3b} $$
-\caption{Conjugating by a homeomorphism
+\caption{Conjugating by a homeomorphism.}
\label{xdfig3}
\end{figure}
\item If $M_i = M'_i \du M''_i$ and $N_i = N'_i \du N''_i$ (and there is a
@@ -122,7 +122,7 @@
(See Figure \ref{xdfig1}.)
\begin{figure}[t]
$$\mathfig{.3}{deligne/dfig1a} \leftarrow \mathfig{.3}{deligne/dfig1b} \rightarrow \mathfig{.3}{deligne/dfig1c}$$
-\caption{Changing the order of a surgery}\label{xdfig1}
+\caption{Changing the order of a surgery.}\label{xdfig1}
\end{figure}
\end{itemize}