# HG changeset patch # User Kevin Walker # Date 1323791087 28800 # Node ID 2232d94b90b86bd5627b08cc1cd8663ac78c5233 # Parent 8372e04e4b7d45519b9894a1f38bf56a9676a7ac remoed hand drawn figs; adjusted some composition symbols diff -r 8372e04e4b7d -r 2232d94b90b8 text/appendixes/comparing_defs.tex --- a/text/appendixes/comparing_defs.tex Mon Dec 12 23:54:57 2011 -0800 +++ b/text/appendixes/comparing_defs.tex Tue Dec 13 07:44:47 2011 -0800 @@ -217,9 +217,9 @@ and by cutting and regluing we can insert (or delete) product regions in the interior of 2-morphisms as well. Figure \ref{fig:product-regions} shows some examples. \begin{figure}[t] -$$ -\mathfig{0.5}{triangle/triangle2} -$$ +%$$ +%\mathfig{0.5}{triangle/triangle2} +%$$ \begin{align*} \begin{tikzpicture}[baseline] \node[draw] (c) at (0,0) [circle through = {(1,0)}] {$f$}; @@ -763,9 +763,9 @@ \label{fzo5} \end{figure} \begin{figure}[t] -$$ -\mathfig{0.6}{triangle/triangle3c} -$$ +%$$ +%\mathfig{0.6}{triangle/triangle3c} +%$$ $$ \begin{tikzpicture} \node (fg1) at (0,0) { @@ -783,7 +783,7 @@ \draw[dashed] (g1) .. controls +(1,.4) and +(-1,.4) .. (g2); \draw (f2) .. controls +(1,.4) and +(-1,1) .. (g2); % -\draw[blue,->] (-0.8,-1.2) node[below] {$(a \circ d) \times I$} -- (1,-0.5) ; +\draw[blue,->] (-0.8,-1.2) node[below] {$(a \bullet d) \times I$} -- (1,-0.5) ; \path[clip] (f1) .. controls +(1,-.4) and +(-1,-.4) .. (f2) .. controls +(1,.4) and +(-1,1) .. (g2) .. controls +(-1,.4) and +(1,.4) .. (g1) @@ -842,7 +842,7 @@ \draw[dashed] (g1) .. controls +(1,.8) and +(-1,.8) .. (g2); \draw (f1) .. controls +(1,1.5) and +(-1,1.5)..(g2); % -\draw[blue,->] (4,1.75) node[above] {$(b \circ d) \times I$}-- + (0,-1); +\draw[blue,->] (4,1.75) node[above] {$(b \bullet d) \times I$}-- + (0,-1); \begin{scope} \path[clip] (f1) .. controls +(1,1.5) and +(-1,1.5).. (g2) .. controls +(-1,.8) and +(1,.8) .. (f2) @@ -853,8 +853,8 @@ \end{scope} \end{tikzpicture} }; -\draw[->] ($(fg1.south)+(0,0.5)$) -- node[left=0.5cm] {add $(b \circ d) \times I$} (fg2); -\draw[->] (fg2) -- node[right=0.5cm] {remove $(a \circ d) \times I$} ($(fg3.south)+(0,1.75)$); +\draw[->] ($(fg1.south)+(0,0.5)$) -- node[left=0.5cm] {add $(b \bullet d) \times I$} (fg2); +\draw[->] (fg2) -- node[right=0.5cm] {remove $(a \bullet d) \times I$} ($(fg3.south)+(0,1.75)$); \path (fg1) -- node {$=$} (fg3); \end{tikzpicture} $$ @@ -866,9 +866,9 @@ as in Figure \ref{fig:associator}. This is just a reparameterization of the pinched product $(a\bullet b\bullet c)\times I$ of $\cC$. \begin{figure}[t] -$$ -\mathfig{0.4}{triangle/triangle4a} -$$ +%$$ +%\mathfig{0.4}{triangle/triangle4a} +%$$ $$ \begin{tikzpicture} \node[circle,fill=black,inner sep=1pt] at (1.73,0) {}; @@ -929,11 +929,11 @@ is equal to the composition of $\alpha$ and $\id_a\bullet v$. (Both are 2-morphisms from $(a\bullet \id_y)\bullet b$ to $a\bullet b$.) \begin{figure}[t] -\begin{align*} -\mathfig{0.4}{triangle/triangle4a} \\ -\mathfig{0.4}{triangle/triangle4b} \\ -\mathfig{0.4}{triangle/triangle4c} -\end{align*} +%\begin{align*} +%\mathfig{0.4}{triangle/triangle4a} \\ +%\mathfig{0.4}{triangle/triangle4b} \\ +%\mathfig{0.4}{triangle/triangle4c} +%\end{align*} \begin{align*} \alpha & = \begin{tikzpicture}[baseline] @@ -1012,7 +1012,6 @@ } \end{tikzpicture} \\ \end{align*} -\nn{remember to change `assoc' to $\alpha$} \caption{Ingredients for the triangle axiom.} \label{fig:ingredients-triangle-axiom} \end{figure} @@ -1025,12 +1024,12 @@ Note that here we have used in an essential way the associativity of product morphisms (Axiom \ref{axiom:product}.3) as well as compatibility of product morphisms with fiber-preserving maps (Axiom \ref{axiom:product}.1). \begin{figure}[t] +%\begin{align*} +%\mathfig{0.4}{triangle/triangle4d} +%\mathfig{0.4}{triangle/triangle4e} \\ +%\end{align*} \begin{align*} -\mathfig{0.4}{triangle/triangle4d} -\mathfig{0.4}{triangle/triangle4e} \\ -\end{align*} -\begin{align*} -u \bullet (b \times I) & = +u *_h (b \times I) & = \begin{tikzpicture}[baseline] \coordinate (L) at (0,0); \coordinate (R) at (3,0); @@ -1058,7 +1057,7 @@ \draw[brown] (MR\n) -- (TR\n); } \end{tikzpicture} \\ -(a \times I) \bullet v & = +(a \times I) *_h v & = \begin{tikzpicture}[baseline] \coordinate (L) at (0,0); \coordinate (R) at (3,0); @@ -1092,7 +1091,7 @@ \end{figure} \begin{figure}[t] \begin{align*} -\mathfig{0.4}{triangle/triangle4f} \\ +%\mathfig{0.4}{triangle/triangle4f} \\ \begin{tikzpicture} \node[circle,fill=black,inner sep=1pt] (A) at (1.73,0) {}; \node[circle,fill=black,inner sep=1pt] (B) at (-1.73,0) {}; @@ -1147,9 +1146,9 @@ \label{fig:vertical-composition} \end{figure} \begin{figure}[t] -\begin{align*} -\mathfig{0.4}{triangle/triangle5} -\end{align*} +%\begin{align*} +%\mathfig{0.4}{triangle/triangle5} +%\end{align*} \begin{align*} \begin{tikzpicture}[baseline] \coordinate (L) at (0,0);