--- a/text/blobdef.tex Mon May 31 17:27:17 2010 -0700
+++ b/text/blobdef.tex Mon May 31 23:42:37 2010 -0700
@@ -39,7 +39,7 @@
\end{itemize}
(See Figure \ref{blob1diagram}.)
\begin{figure}[t]\begin{equation*}
-\mathfig{.9}{definition/single-blob}
+\mathfig{.6}{definition/single-blob}
\end{equation*}\caption{A 1-blob diagram.}\label{blob1diagram}\end{figure}
In order to get the linear structure correct, we (officially) define
\[
@@ -75,7 +75,7 @@
\end{itemize}
(See Figure \ref{blob2ddiagram}.)
\begin{figure}[t]\begin{equation*}
-\mathfig{.9}{definition/disjoint-blobs}
+\mathfig{.6}{definition/disjoint-blobs}
\end{equation*}\caption{A disjoint 2-blob diagram.}\label{blob2ddiagram}\end{figure}
We also identify $(B_0, B_1, u_0, u_1, r)$ with $-(B_1, B_0, u_1, u_0, r)$;
reversing the order of the blobs changes the sign.
@@ -95,7 +95,7 @@
\end{itemize}
(See Figure \ref{blob2ndiagram}.)
\begin{figure}[t]\begin{equation*}
-\mathfig{.9}{definition/nested-blobs}
+\mathfig{.6}{definition/nested-blobs}
\end{equation*}\caption{A nested 2-blob diagram.}\label{blob2ndiagram}\end{figure}
Let $r = r_1 \bullet r'$, where $r_1 \in \cC(B_1 \setmin B_0; c_0, c_1)$
(for some $c_1 \in \cC(B_1)$) and
@@ -153,7 +153,7 @@
\end{itemize}
(See Figure \ref{blobkdiagram}.)
\begin{figure}[t]\begin{equation*}
-\mathfig{.9}{definition/k-blobs}
+\mathfig{.7}{definition/k-blobs}
\end{equation*}\caption{A $k$-blob diagram.}\label{blobkdiagram}\end{figure}
If two blob diagrams $D_1$ and $D_2$