# HG changeset patch # User Scott Morrison # Date 1323414611 28800 # Node ID ee0c940fce591e1da44b23d5c98feb80baeb708e # Parent 04079a7aeaeff0b91f4ac373f5fa0c318f87ce74 just one figure diff -r 04079a7aeaef -r ee0c940fce59 text/appendixes/comparing_defs.tex --- a/text/appendixes/comparing_defs.tex Thu Dec 08 17:41:42 2011 -0800 +++ b/text/appendixes/comparing_defs.tex Thu Dec 08 23:10:11 2011 -0800 @@ -530,7 +530,7 @@ Figure \ref{fig:horizontal-compositions-equal}illustrates part of the proof that these four 2-morphisms are equal. Similar arguments show that horizontal composition is associative. \begin{figure}[t] -\begin{equation*} +\begin{align*} \raisebox{-.9cm}{ \begin{tikzpicture} \draw (0,0) .. controls +(1,.8) and +(-1,.8) .. node[above] {$b$} (2.9,0) @@ -544,7 +544,7 @@ .. controls +(-1,-.8) and +(1,-.8) .. node[below] {$c$} (0,0); \draw[->, thick, orange!50!brown] (1.45,-.4)-- node[left, black] {$g$} +(0,.8); \end{tikzpicture}} -\;=\; +\;&=\; \raisebox{-1.9cm}{ \begin{tikzpicture} \draw (0,0) coordinate (p1); @@ -569,11 +569,86 @@ \draw[->, thick, orange!50!brown] (1.45,-1.1)-- node[left, black] {$f$} +(0,.7); \draw[->, thick, orange!50!brown] (4.35,.4)-- node[left, black] {$g$} +(0,.7); \draw[->, thick, blue!75!yellow] (1.5,.78) node[black, above] {$(b\cdot c)\times I$} -- (2.5,0); -\end{tikzpicture}} -\end{equation*} -\begin{equation*} -\mathfig{0.6}{triangle/triangle3b} -\end{equation*} +\end{tikzpicture}} \\ +\;&=\; +\raisebox{-2.1cm}{ +\begin{tikzpicture} + \draw (0,0) coordinate (p1); + \draw (5.8,0) coordinate (p2); + \draw (2.9,0) coordinate (pu); + \draw (2.9,-.9) coordinate (pd); + \begin{scope} + \clip (p1) .. controls +(.6,-.3) and +(-.5,-.3) .. (pu) + .. controls +(.5,-.3) and +(-.6,-.3) .. (p2) + .. controls +(-.6,-.9) and +(.5,0) .. (pd) + .. controls +(-.5,0) and +(.6,-.9) .. (p1); + \foreach \t in {0,.03,...,1} { + \draw[green!50!brown] ($(p1)!\t!(p2) + (0,2)$) -- +(0,-4); + } + \end{scope} + \draw (p1) .. controls +(.6,-.3) and +(-.5,-.3) .. (pu) + .. controls +(.5,-.3) and +(-.6,-.3) .. (p2) + .. controls +(-.6,-.9) and +(.5,0) .. (pd) + .. controls +(-.5,0) and +(.6,-.9) .. (p1); + \draw (p1) .. controls +(1,1) and +(-1,1) .. (pu); + \draw (p2) .. controls +(-1,1) and +(1,1) .. (pu); + \draw[->, thick, orange!50!brown] (1.45,-0.1)-- node[left, black] {$f$} +(0,.7); + \draw[->, thick, orange!50!brown] (4.35,-0.1)-- node[left, black] {$g$} +(0,.7); + \draw[->, thick, blue!75!yellow] (4.3,-1.5) node[black, below] {$(a\cdot c)\times I$} -- (3.3,-0.5); +\end{tikzpicture}} \\ +\;&=\; +\raisebox{-1.9cm}{ +\begin{tikzpicture}[y=-1cm] + \draw (0,0) coordinate (p1); + \draw (5.8,0) coordinate (p2); + \draw (2.9,.3) coordinate (pu); + \draw (2.9,-.3) coordinate (pd); + \begin{scope} + \clip (p1) .. controls +(.6,.3) and +(-.5,0) .. (pu) + .. controls +(.5,0) and +(-.6,.3) .. (p2) + .. controls +(-.6,-.3) and +(.5,0) .. (pd) + .. controls +(-.5,0) and +(.6,-.3) .. (p1); + \foreach \t in {0,.03,...,1} { + \draw[green!50!brown] ($(p1)!\t!(p2) + (0,2)$) -- +(0,-4); + } + \end{scope} + \draw (p1) .. controls +(.6,.3) and +(-.5,0) .. (pu) + .. controls +(.5,0) and +(-.6,.3) .. (p2) + .. controls +(-.6,-.3) and +(.5,0) .. (pd) + .. controls +(-.5,0) and +(.6,-.3) .. (p1); + \draw (p1) .. controls +(1,-2) and +(-1,-1) .. (pd); + \draw (p2) .. controls +(-1,2) and +(1,1) .. (pu); + \draw[<-, thick, orange!50!brown] (1.45,-1.1)-- node[left, black] {$f$} +(0,.7); + \draw[<-, thick, orange!50!brown] (4.35,.4)-- node[left, black] {$g$} +(0,.7); + \draw[->, thick, blue!75!yellow] (1.5,.78) node[black, below] {$(a\cdot d)\times I$} -- (2.5,0); +\end{tikzpicture}} \\ +\;&=\; +\raisebox{-1.0cm}{ +\begin{tikzpicture}[y=-1cm] + \draw (0,0) coordinate (p1); + \draw (5.8,0) coordinate (p2); + \draw (2.9,0) coordinate (pu); + \draw (2.9,-.9) coordinate (pd); + \begin{scope} + \clip (p1) .. controls +(.6,-.3) and +(-.5,-.3) .. (pu) + .. controls +(.5,-.3) and +(-.6,-.3) .. (p2) + .. controls +(-.6,-.9) and +(.5,0) .. (pd) + .. controls +(-.5,0) and +(.6,-.9) .. (p1); + \foreach \t in {0,.03,...,1} { + \draw[green!50!brown] ($(p1)!\t!(p2) + (0,2)$) -- +(0,-4); + } + \end{scope} + \draw (p1) .. controls +(.6,-.3) and +(-.5,-.3) .. (pu) + .. controls +(.5,-.3) and +(-.6,-.3) .. (p2) + .. controls +(-.6,-.9) and +(.5,0) .. (pd) + .. controls +(-.5,0) and +(.6,-.9) .. (p1); + \draw (p1) .. controls +(1,1) and +(-1,1) .. (pu); + \draw (p2) .. controls +(-1,1) and +(1,1) .. (pu); + \draw[<-, thick, orange!50!brown] (1.45,-0.1)-- node[left, black] {$f$} +(0,.7); + \draw[<-, thick, orange!50!brown] (4.35,-0.1)-- node[left, black] {$g$} +(0,.7); + \draw[->, thick, blue!75!yellow] (4.3,-1.5) node[black, above] {$(b\cdot d)\times I$} -- (3.3,-0.5); +\end{tikzpicture}} +\end{align*} \caption{Horizontal composition of 2-morphisms} \label{fzo5} \end{figure}