# HG changeset patch
# User scott@6e1638ff-ae45-0410-89bd-df963105f760
# Date 1257611460 0
# Node ID c6cf04387c76de88d22fd63bc3237c2f24b83abf
# Parent  3b228545d9bb5f83d55cf7b9149d5d0c4fe2b37e
...

diff -r 3b228545d9bb -r c6cf04387c76 talks/20091108-Riverside/riverside1.pdf
Binary file talks/20091108-Riverside/riverside1.pdf has changed
diff -r 3b228545d9bb -r c6cf04387c76 talks/20091108-Riverside/riverside1.tex
--- a/talks/20091108-Riverside/riverside1.tex	Sat Nov 07 15:23:53 2009 +0000
+++ b/talks/20091108-Riverside/riverside1.tex	Sat Nov 07 16:31:00 2009 +0000
@@ -101,14 +101,6 @@
 \begin{block}{Pasting diagrams}
 Fix an $n$-category with strong duality $\cC$. A \emph{field} on $\cM$ is a pasting diagram drawn on $\cM$, with cells labelled by morphisms from $\cC$.
 \end{block}
-\begin{example}[$\cC = \text{TL}_d$ the Temperley-Lieb category]
-$$\roundframe{\mathfig{0.35}{definition/example-pasting-diagram}} \in \cF^{\text{TL}_d}\left(T^2\right)$$
-\end{example}
-\begin{block}{}
-Given a pasting diagram on a ball, we can evaluate it to a morphism. We call the kernel the \emph{null fields}.
-\vspace{-3mm}
-$$\text{ev}\Bigg(\roundframe{\mathfig{0.12}{definition/evaluation1}} - \frac{1}{d}\roundframe{\mathfig{0.12}{definition/evaluation2}}\Bigg) = 0$$
-\end{block}
 \end{frame}
 
 \begin{frame}{Background: TQFT invariants}