Binary file RefereeReport.pdf has changed
--- a/text/ncat.tex Wed Aug 10 21:46:27 2011 -0600
+++ b/text/ncat.tex Thu Aug 11 12:08:38 2011 -0600
@@ -1261,7 +1261,12 @@
\cE\cB_n^k \times A \times \cdots \times A \to A ,
\]
where $\cE\cB_n^k$ is the $k$-th space of the $\cE\cB_n$ operad.
-\nn{need to finish this}
+Let $(b, a_1,\ldots,a_k)$ be a point of $\cE\cB_n^k \times A \times \cdots \times A \to A$.
+The $i$-th embedding of $b$ together with $a_i$ determine an element of $\cC(B_i)$,
+where $B_i$ denotes the $i$-th little ball.
+Using composition of $n$-morphsims in $\cC$, and padding the spaces between the little balls with the
+(essentially unique) identity $n$-morphism of $\cC$, we can construct a well-defined element
+of $\cC(B^n) = A$.
If we apply the homotopy colimit construction of the next subsection to this example,
we get an instance of Lurie's topological chiral homology construction.