diff -r 1b9b2aab1f35 -r 0047a1211c3b blob1.tex
--- a/blob1.tex	Tue Aug 26 23:13:07 2008 +0000
+++ b/blob1.tex	Wed Oct 22 21:56:42 2008 +0000
@@ -87,26 +87,34 @@
 \subsection*{What else?...}
 
 \begin{itemize}
-\item Derive Hochschild standard results from blob point of view?
+\item higher priority
+\begin{itemize}
+\item K\&S: learn the state of the art in A-inf categories
+(tensor products, Kadeishvili result, ...)
+\item K: so-called evaluation map stuff
+\item K: topological fields
+\item section describing intended applications
+\item say something about starting with semisimple n-cat (trivial?? not trivial?)
+\item T.O.C.
+\end{itemize}
+\item medium priority
+\begin{itemize}
 \item $n=2$ examples
-\item Kh
 \item dimension $n+1$ (generalized Deligne conjecture?)
 \item should be clear about PL vs Diff; probably PL is better
 (or maybe not)
 \item say what we mean by $n$-category, $A_\infty$ or $E_\infty$ $n$-category
 \item something about higher derived coend things (derived 2-coend, e.g.)
-\item section describing intended applications
-\item actual computations?
 \item shuffle product vs gluing product (?)
-\item say something about starting with semisimple n-cat (trivial?? not trivial?)
+\item commutative algebra results
+\item $A_\infty$ blob complex
+\item connection between $A_\infty$ operad and topological $A_\infty$ cat defs
 \end{itemize}
-
-more specific, prioritized, to-do:
+\item lower priority
 \begin{itemize}
-\item K: so-called evaluation map stuff
-\item K: topological fields
-\item K\&S: learn the state of the art in A-inf categories
-(tensor products, Kadeishvili result, ...)
+\item Derive Hochschild standard results from blob point of view?
+\item Kh
+\end{itemize}
 \end{itemize}