X-Git-Url: http://gitweb.michael.orlitzky.com/?p=mjotex.git;a=blobdiff_plain;f=examples.tex;h=c1f3df1eb64e416fb00c52f809cdcfc562138324;hp=6e1c5007abf16c19d48f8eadb7c1a03b85a49cab;hb=71b85fe2012cdf733f6e72137038d7d9960ddf08;hpb=4fd0c97de0370110d6fecab412ec1b5b831611e8 diff --git a/examples.tex b/examples.tex index 6e1c500..c1f3df1 100644 --- a/examples.tex +++ b/examples.tex @@ -1,10 +1,37 @@ \documentclass{report} +% Setting hypertexnames=false forces hyperref to use a consistent +% internal counter for proposition/equation references rather than +% being clever, which doesn't work after we reset those counters. +\usepackage[hypertexnames=false]{hyperref} +\hypersetup{ + colorlinks=true, + linkcolor=blue, + citecolor=blue +} + +% We have to load this after hyperref, so that links work, but before +% mjotex so that mjotex knows to define its glossary entries. +\usepackage[nonumberlist]{glossaries} +\makenoidxglossaries + +% If you want an index, we can do that too. You'll need to define +% the "INDICES" variable in the GNUmakefile, though. +\usepackage{makeidx} +\makeindex + \usepackage{mjotex} \usepackage{mathtools} \begin{document} + \begin{section}{Algebra} + If $R$ is a \index{commutative ring}, then $\polyring{R}{X,Y,Z}$ + is a multivariate polynomial ring with indeterminates $X$, $Y$, + and $Z$, and coefficients in $R$. If $R$ is a moreover an integral + domain, then its fraction field is $\Frac{R}$. + \end{section} + \begin{section}{Algorithm} An example of an algorithm (bogosort) environment. @@ -109,6 +136,11 @@ proper face, then we write $F \properfaceof K$. \end{section} + \begin{section}{Euclidean Jordan algebras} + The Jordan product of $x$ and $y$ in some Euclidean Jordan algebra + is $\jp{x}{y}$. + \end{section} + \begin{section}{Font} We can write things like Carathéodory and Güler and $\mathbb{R}$. \end{section} @@ -135,6 +167,9 @@ $\boundedops[W]{V}$. If $W = V$, then we write $\boundedops{V}$ instead. + If you want to solve a system of equations, try Cramer's + rule~\cite{ehrenborg}. + The direct sum of $V$ and $W$ is $\directsum{V}{W}$, of course, but what if $W = V^{\perp}$? Then we wish to indicate that fact by writing $\directsumperp{V}{W}$. That operator should survive a @@ -161,7 +196,7 @@ \end{section} \begin{section}{Listing} - Here's an interactive sage prompt: + Here's an interactive SageMath prompt: \begin{tcblisting}{listing only, colback=codebg, @@ -174,6 +209,14 @@ [0 0], [0 0], [1 0], [0 1] ] \end{tcblisting} + + However, the smart way to display a SageMath listing is to load it + from an external file (under the ``listings'' subdirectory): + + \sagelisting{example} + + Keeping the listings in separate files makes it easy for the build + system to test them. \end{section} \begin{section}{Miscellaneous} @@ -300,4 +343,13 @@ $\closure{X}$ and its boundary is $\boundary{X}$. \end{section} + \setlength{\glslistdottedwidth}{.3\linewidth} + \setglossarystyle{listdotted} + \glsaddall + \printnoidxglossaries + + \bibliographystyle{mjo} + \bibliography{local-references} + + \printindex \end{document}