--- a/text/ncat.tex Mon Jun 28 10:03:13 2010 -0700
+++ b/text/ncat.tex Wed Jun 30 08:55:46 2010 -0700
@@ -1399,14 +1399,6 @@
We will define a more general self tensor product (categorified coend) below.
-%\nn{what about self tensor products /coends ?}
-
-\nn{maybe ``tensor product" is not the best name?}
-
-%\nn{start with (less general) tensor products; maybe change this later}
-
-
-
\subsection{Morphisms of $A_\infty$ $1$-category modules}
\label{ss:module-morphisms}
@@ -1608,8 +1600,7 @@
$g((\bd \olD)\ot -)$ (where the $g((\bd_0 \olD)\ot -)$ part of $g((\bd \olD)\ot -)$
should be interpreted as above).
-Define a {\it naive morphism}
-\nn{should consider other names for this}
+Define a {\it strong morphism}
of modules to be a collection of {\it chain} maps
\[
h_K : \cX(K)\to \cY(K)
@@ -1623,7 +1614,7 @@
\ar[d]^{\gl} \\
\cX(K) \ar[r]^{h_{K}} & \cY(K)
} \]
-Given such an $h$ we can construct a non-naive morphism $g$, with $\bd g = 0$, as follows.
+Given such an $h$ we can construct a morphism $g$, with $\bd g = 0$, as follows.
Define $g(\olD\ot - ) = 0$ if the length/degree of $\olD$ is greater than 0.
If $\olD$ consists of the single subdivision $K = I_0\cup\cdots\cup I_q$ then define
\[