--- a/text/tqftreview.tex Thu Aug 11 13:54:38 2011 -0700
+++ b/text/tqftreview.tex Thu Aug 11 22:14:11 2011 -0600
@@ -85,7 +85,7 @@
\item The subset $\cC_n(X;c)$ of top-dimensional fields
with a given boundary condition is an object in our symmetric monoidal category $\cS$.
(This condition is of course trivial when $\cS = \Set$.)
-If the objects are sets with extra structure (e.g. $\cS = \Vect$ or $\Kom$),
+If the objects are sets with extra structure (e.g. $\cS = \Vect$ or $\Kom$ (chain complexes)),
then this extra structure is considered part of the definition of $\cC_n$.
Any maps mentioned below between fields on $n$-manifolds must be morphisms in $\cS$.
\item $\cC_k$ is compatible with the symmetric monoidal
@@ -299,7 +299,7 @@
domain and range determined by the transverse orientation and the labelings of the 1-cells.
\end{itemize}
-We want fields on 1-manifolds to be enriched over Vect, so we also allow formal linear combinations
+We want fields on 1-manifolds to be enriched over $\Vect$, so we also allow formal linear combinations
of the above fields on a 1-manifold $X$ so long as these fields restrict to the same field on $\bd X$.
In addition, we mod out by the relation which replaces
@@ -371,7 +371,7 @@
\subsection{Local relations}
\label{sec:local-relations}
-For convenience we assume that fields are enriched over Vect.
+For convenience we assume that fields are enriched over $\Vect$.
Local relations are subspaces $U(B; c)\sub \cC(B; c)$ of the fields on balls which form an ideal under gluing.
Again, we give the examples first.
@@ -400,7 +400,7 @@
\begin{enumerate}
\item Functoriality:
$f(U(B; c)) = U(B', f(c))$ for all homeomorphisms $f: B \to B'$
-\item Local relations imply extended isotopy:
+\item Local relations imply extended isotopy invariance:
if $x, y \in \cC(B; c)$ and $x$ is extended isotopic
to $y$, then $x-y \in U(B; c)$.
\item Ideal with respect to gluing: