diff -r 8e055b7c0768 -r b236746e8e4d text/ncat.tex --- a/text/ncat.tex Tue Aug 31 21:09:31 2010 -0700 +++ b/text/ncat.tex Wed Sep 01 13:34:21 2010 -0700 @@ -1639,7 +1639,7 @@ More specifically, $D\to D'$ is an antirefinement if $D'$ is obtained from $D$ by gluing subintervals together and/or omitting some of the rightmost subintervals. (See Figure \ref{fig:lmar}.) -\begin{figure}[t]$$ +\begin{figure}[t] \centering \definecolor{arcolor}{rgb}{.75,.4,.1} \begin{tikzpicture}[line width=1pt] \fill (0,0) circle (.1); @@ -1679,7 +1679,6 @@ } \end{tikzpicture} -$$ \caption{Antirefinements of left-marked intervals}\label{fig:lmar}\end{figure} Now we define the chain complex $\hom_\cC(\cX_\cC \to \cY_\cC)$. @@ -1735,7 +1734,7 @@ These are required to commute with gluing; for each subdivision $K = I_1\cup\cdots\cup I_q$ the following diagram commutes: \[ \xymatrix{ - \cX(I_1)\ot\cC(I_2)\ot\cdots\ot\cC(I_q) \ar[r]^{h_{I_0}\ot \id} + \cX(I_1)\ot\cC(I_2)\ot\cdots\ot\cC(I_q) \ar[r]^{h_{I_1}\ot \id} \ar[d]_{\gl} & \cY(I_1)\ot\cC(I_2)\ot\cdots\ot\cC(I_q) \ar[d]^{\gl} \\ \cX(K) \ar[r]^{h_{K}} & \cY(K) @@ -1875,8 +1874,7 @@ (see Figure \ref{feb21b}). These restrictions are 0-morphisms $(a, b)$ of $\cA$ and $\cB$. -\begin{figure}[t] -$$ +\begin{figure}[t] \centering \begin{tikzpicture}[blue,line width=2pt] \draw (0,1) -- (0,-1) node[below] {$X$}; @@ -1891,7 +1889,6 @@ \path (bottom) node[below]{$X \times J$}; \end{tikzpicture} -$$ \caption{The pinched product $X\times J$} \label{feb21b} \end{figure} @@ -1904,8 +1901,7 @@ to obtain an $\cA_0$-$\cA_l$ $0$-sphere module and, forgetfully, an $n{-}1$-category. This amounts to a definition of taking tensor products of $0$-sphere modules over $n$-categories. -\begin{figure}[t] -$$ +\begin{figure}[t] \centering \begin{tikzpicture}[baseline,line width = 2pt] \draw[blue] (0,0) -- (6,0); \foreach \x/\n in {0.5/0,1.5/1,3/2,4.5/3,5.5/4} { @@ -1927,7 +1923,6 @@ \path (\q:2.4) node {\color{green!50!brown}$\cM_{\n}$}; } \end{tikzpicture} -$$ \caption{Marked and labeled 1-manifolds} \label{feb21c} \end{figure} @@ -1956,8 +1951,7 @@ (See Figure \nn{need figure}.) We now proceed as in the above module definitions. -\begin{figure}[!ht] -$$ +\begin{figure}[t] \centering \begin{tikzpicture}[baseline,line width = 2pt] \draw[blue][fill=blue!15!white] (0,0) circle (2); \fill[red] (0,0) circle (0.1); @@ -1968,7 +1962,6 @@ \draw[line width=1pt, green!50!brown, ->] (M\n.\qm+135) to[out=\qm+135,in=\qm+90] (\qm+5:1.3); } \end{tikzpicture} -$$ \caption{Cone on a marked circle} \label{feb21d} \end{figure}