Binary file RefereeReport.pdf has changed
--- a/text/ncat.tex Tue Aug 09 23:57:01 2011 -0700
+++ b/text/ncat.tex Wed Aug 10 00:02:56 2011 -0700
@@ -1584,7 +1584,7 @@
%define $k$-cat $\cC(\cdot\times W)$}
\subsection{Modules}
-
+\label{sec:modules}
Next we define ordinary and $A_\infty$ disk-like $n$-category modules.
The definition will be very similar to that of disk-like $n$-categories,
but with $k$-balls replaced by {\it marked $k$-balls,} defined below.
--- a/text/tqftreview.tex Tue Aug 09 23:57:01 2011 -0700
+++ b/text/tqftreview.tex Wed Aug 10 00:02:56 2011 -0700
@@ -449,7 +449,7 @@
The above construction can be extended to higher codimensions, assigning
a $k$-category $A(Y)$ to an $n{-}k$-manifold $Y$, for $0 \le k \le n$.
These invariants fit together via actions and gluing formulas.
-We describe only the case $k=1$ below.
+We describe only the case $k=1$ below. We describe these extensions in the more general setting of the blob complex later, in particular in Examples \ref{ex:ncats-from-tqfts} and \ref{ex:blob-complexes-of-balls} and in \S \ref{sec:modules}.
The construction of the $n{+}1$-dimensional part of the theory (the path integral)
requires that the starting data (fields and local relations) satisfy additional