X-Git-Url: http://gitweb.michael.orlitzky.com/?a=blobdiff_plain;f=examples.tex;h=07db38e5424cdea594882a58c97aa621abf3d204;hb=e799531ea384c819fc849d2d512062f989453f04;hp=f33ed747d4f5e03dd3cb33f7106e9a417d8f2748;hpb=db9108a5c69e72667f4731880f1e3173459675fd;p=mjotex.git diff --git a/examples.tex b/examples.tex index f33ed74..07db38e 100644 --- a/examples.tex +++ b/examples.tex @@ -1,10 +1,22 @@ \documentclass{report} +% We have to load this before mjotex so that mjotex knows to define +% its glossary entries. +\usepackage[nonumberlist]{glossaries} +\makenoidxglossaries + \usepackage{mjotex} \usepackage{mathtools} \begin{document} + \begin{section}{Algebra} + If $R$ is a 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. @@ -32,6 +44,11 @@ domain, then the preimage under $f$ of $A$ is $\preimage{f}{A}$. \end{section} + \begin{section}{Calculus} + The gradient of $f : \Rn \rightarrow \Rn[1]$ is $\gradient{f} : + \Rn \rightarrow \Rn$. + \end{section} + \begin{section}{Common} The function $f$ applied to $x$ is $f\of{x}$. We can group terms like $a + \qty{b - c}$ or $a + \qty{b - \sqty{c - d}}$. Here's a @@ -69,6 +86,20 @@ \begin{equation*} \unionmany{k=1}{\infty}{A_{k}} = \intersectmany{k=1}{\infty}{B_{k}} \end{equation*} + + Finally, we have the four standard types of intervals in $\Rn[1]$, + % + \begin{align*} + \intervaloo{a}{b} &= \setc{ x \in \Rn[1]}{ a < x < b },\\ + \intervaloc{a}{b} &= \setc{ x \in \Rn[1]}{ a < x \le b },\\ + \intervalco{a}{b} &= \setc{ x \in \Rn[1]}{ a \le x < b }, \text{ and }\\ + \intervalcc{a}{b} &= \setc{ x \in \Rn[1]}{ a \le x \le b }. + \end{align*} + \end{section} + + \begin{section}{Complex} + We sometimes want to conjugate complex numbers like + $\compconj{a+bi} = a - bi$. \end{section} \begin{section}{Cone} @@ -85,7 +116,14 @@ The conic hull of a set $X$ is $\cone{X}$; its affine hull is $\aff{X}$, and its convex hull is $\conv{X}$. If $K$ is a cone, then its lineality space is $\linspace{K}$, its lineality is - $\lin{K}$, and its extreme directions are $\Ext{K}$. + $\lin{K}$, and its extreme directions are $\Ext{K}$. The fact that + $F$ is a face of $K$ is denoted by $F \faceof K$; if $F$ is a + 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} @@ -98,7 +136,9 @@ their tensor product is $\tp{x}{y}$. The Kronecker product of matrices $A$ and $B$ is $\kp{A}{B}$. The adjoint of the operator $L$ is $\adjoint{L}$, or if it's a matrix, then its transpose is - $\transpose{L}$. Its trace is $\trace{L}$. + $\transpose{L}$. Its trace is $\trace{L}$. Another matrix-specific + concept is the Moore-Penrose pseudoinverse of $L$, denoted by + $\pseudoinverse{L}$. The span of a set $X$ is $\spanof{X}$, and its codimension is $\codim{X}$. The projection of $X$ onto $V$ is $\proj{V}{X}$. The @@ -138,7 +178,7 @@ \end{section} \begin{section}{Listing} - Here's an interactive sage prompt: + Here's an interactive SageMath prompt: \begin{tcblisting}{listing only, colback=codebg, @@ -151,6 +191,14 @@ [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} @@ -221,6 +269,10 @@ fox \end{theorem} + \begin{exercise} + jumps + \end{exercise} + \begin{definition} quod \end{definition} @@ -251,6 +303,10 @@ fox \end{theorem*} + \begin{exercise*} + jumps + \end{exercise*} + \begin{definition*} quod \end{definition*} @@ -269,4 +325,8 @@ $\closure{X}$ and its boundary is $\boundary{X}$. \end{section} + \setlength{\glslistdottedwidth}{.3\linewidth} + \setglossarystyle{listdotted} + \glsaddall + \printnoidxglossaries \end{document}