3 % Setting hypertexnames=false forces hyperref to use a consistent
4 % internal counter for proposition/equation references rather than
5 % being clever, which doesn't work after we reset those counters.
6 \usepackage[hypertexnames=false
]{hyperref
}
13 % We have to load this after hyperref, so that links work, but before
14 % mjotex so that mjotex knows to define its glossary entries.
15 \usepackage[nonumberlist
]{glossaries
}
18 % If you want an index, we can do that too. You'll need to define
19 % the "INDICES" variable in the GNUmakefile, though.
24 \usepackage{mathtools
}
28 \begin{section
}{Algebra
}
29 If $R$ is a
\index{commutative ring
}, then $
\polyring{R
}{X,Y,Z
}$
30 is a multivariate polynomial ring with indeterminates $X$, $Y$,
31 and $Z$, and coefficients in $R$. If $R$ is a moreover an integral
32 domain, then its fraction field is $
\Frac{R
}$.
35 \begin{section
}{Algorithm
}
36 An example of an algorithm (bogosort) environment.
39 \caption{Sort a list of numbers
}
41 \Require{A list of numbers $L$
}
42 \Ensure{A new, sorted copy $M$ of the list $L$
}
46 \While{$M$ is not sorted
}
47 \State{Rearrange $M$ randomly
}
55 \begin{section
}{Arrow
}
56 The constant function that always returns $a$ is $
\const{a
}$. The
57 identity operator on $V$ is $
\identity{V
}$. The composition of $f$
58 and $g$ is $
\compose{f
}{g
}$. The inverse of $f$ is
59 $
\inverse{f
}$. If $f$ is a function and $A$ is a subset of its
60 domain, then the preimage under $f$ of $A$ is $
\preimage{f
}{A
}$.
63 \begin{section
}{Calculus
}
64 The gradient of $f :
\Rn \rightarrow \Rn[1]$ is $
\gradient{f
} :
68 \begin{section
}{Common
}
69 The function $f$ applied to $x$ is $f
\of{x
}$. We can group terms
70 like $a +
\qty{b - c
}$ or $a +
\qty{b -
\sqty{c - d
}}$. Here's a
71 set $
\set{1,
2,
3} =
\setc{n
\in \Nn[1]}{ n
\le 3 }$. Here's a pair
72 of things $
\pair{1}{2}$ or a triple of them $
\triple{1}{2}{3}$,
73 and the factorial of the number $
10$ is $
\factorial{10}$.
75 The Cartesian product of two sets $A$ and $B$ is
76 $
\cartprod{A
}{B
}$; if we take the product with $C$ as well, then
77 we obtain $
\cartprodthree{A
}{B
}{C
}$. The direct sum of $V$ and $W$
78 is $
\directsum{V
}{W
}$. Or three things,
79 $
\directsumthree{U
}{V
}{W
}$. How about more things? Like
80 $
\directsummany{k=
1}{\infty}{V_
{k
}} \ne
81 \cartprodmany{k=
1}{\infty}{V_
{k
}}$. Those direct sums and
82 cartesian products adapt nicely to display equations:
85 \directsummany{k=
1}{\infty}{V_
{k
}} \ne \cartprodmany{k=
1}{\infty}{V_
{k
}}.
87 Here are a few common tuple spaces that should not have a
88 superscript when that superscript would be one: $
\Nn[1]$,
89 $
\Zn[1]$, $
\Qn[1]$, $
\Rn[1]$, $
\Cn[1]$. However, if the
90 superscript is (say) two, then it appears: $
\Nn[2]$, $
\Zn[2]$,
91 $
\Qn[2]$, $
\Rn[2]$, $
\Cn[2]$.
93 We also have a few basic set operations, for example the union of
94 two or three sets: $
\union{A
}{B
}$, $
\unionthree{A
}{B
}{C
}$. And of
95 course with union comes intersection: $
\intersect{A
}{B
}$,
96 $
\intersectthree{A
}{B
}{C
}$. We can also take an arbitrary
97 (indexed) union and intersections of things, like
98 $
\unionmany{k=
1}{\infty}{A_
{k
}}$ or
99 $
\intersectmany{k=
1}{\infty}{B_
{k
}}$. The best part about those
100 is that they do the right thing in a display equation:
103 \unionmany{k=
1}{\infty}{A_
{k
}} =
\intersectmany{k=
1}{\infty}{B_
{k
}}
106 Finally, we have the four standard types of intervals in $
\Rn[1]$,
109 \intervaloo{a
}{b
} &=
\setc{ x
\in \Rn[1]}{ a < x < b
},\\
110 \intervaloc{a
}{b
} &=
\setc{ x
\in \Rn[1]}{ a < x
\le b
},\\
111 \intervalco{a
}{b
} &=
\setc{ x
\in \Rn[1]}{ a
\le x < b
},
\text{ and
}\\
112 \intervalcc{a
}{b
} &=
\setc{ x
\in \Rn[1]}{ a
\le x
\le b
}.
116 \begin{section
}{Complex
}
117 We sometimes want to conjugate complex numbers like
118 $
\compconj{a+bi
} = a - bi$.
121 \begin{section
}{Cone
}
122 The dual cone of $K$ is $
\dual{K
}$. Some familiar symmetric cones
123 are $
\Rnplus$, $
\Lnplus$, $
\Snplus$, and $
\Hnplus$. If cones
124 $K_
{1}$ and $K_
{2}$ are given, we can define $
\posops{K_
{1}}$,
125 $
\posops[K_
{2}]{K_
{1}}$, $
\Sof{K_
{1}}$, $
\Zof{K_
{1}}$,
126 $
\LL{K_
{1}}$, and $
\lyapunovrank{K_
{1}}$. We can also define $x
127 \gecone_{K
} y$, $x
\gtcone_{K
} y$, $x
\lecone_{K
} y$, and $x
128 \ltcone_{K
} y$ with respect to a cone $K$.
131 \begin{section
}{Convex
}
132 The conic hull of a set $X$ is $
\cone{X
}$; its affine hull is
133 $
\aff{X
}$, and its convex hull is $
\conv{X
}$. If $K$ is a cone,
134 then its lineality space is $
\linspace{K
}$, its lineality is
135 $
\lin{K
}$, and its extreme directions are $
\Ext{K
}$. The fact that
136 $F$ is a face of $K$ is denoted by $F
\faceof K$; if $F$ is a
137 proper face, then we write $F
\properfaceof K$.
140 \begin{section
}{Euclidean Jordan algebras
}
141 The Jordan product of $x$ and $y$ in some Euclidean Jordan algebra
145 \begin{section
}{Font
}
146 We can write things like Carathéodory and Güler and $
\mathbb{R
}$.
149 \begin{section
}{Linear algebra
}
150 The absolute value of $x$ is $
\abs{x
}$, or its norm is
151 $
\norm{x
}$. The inner product of $x$ and $y$ is $
\ip{x
}{y
}$ and
152 their tensor product is $
\tp{x
}{y
}$. The Kronecker product of
153 matrices $A$ and $B$ is $
\kp{A
}{B
}$. The adjoint of the operator
154 $L$ is $
\adjoint{L
}$, or if it's a matrix, then its transpose is
155 $
\transpose{L
}$. Its trace is $
\trace{L
}$. Another matrix-specific
156 concept is the Moore-Penrose pseudoinverse of $L$, denoted by
159 The span of a set $X$ is $
\spanof{X
}$, and its codimension is
160 $
\codim{X
}$. The projection of $X$ onto $V$ is $
\proj{V
}{X
}$. The
161 automorphism group of $X$ is $
\Aut{X
}$, and its Lie algebra is
162 $
\Lie{X
}$. We can write a column vector $x
\coloneqq
163 \colvec{x_
{1},x_
{2},x_
{3},x_
{4}}$ and turn it into a $
2 \times 2$
164 matrix with $
\matricize{x
}$. To recover the vector, we use
165 $
\vectorize{\matricize{x
}}$.
167 The set of all bounded linear operators from $V$ to $W$ is
168 $
\boundedops[W
]{V
}$. If $W = V$, then we write $
\boundedops{V
}$
171 If you want to solve a system of equations, try Cramer's
172 rule~
\cite{ehrenborg
}.
174 The direct sum of $V$ and $W$ is $
\directsum{V
}{W
}$, of course,
175 but what if $W = V^
{\perp}$? Then we wish to indicate that fact by
176 writing $
\directsumperp{V
}{W
}$. That operator should survive a
177 display equation, too, and the weight of the circle should match
178 that of the usual direct sum operator.
181 Z =
\directsumperp{V
}{W
}\\
182 \oplus \oplusperp \oplus \oplusperp
185 Its form should also survive in different font sizes...
188 Z =
\directsumperp{V
}{W
}\\
189 \oplus \oplusperp \oplus \oplusperp
193 Z =
\directsumperp{V
}{W
}\\
194 \oplus \oplusperp \oplus \oplusperp
199 \begin{section
}{Listing
}
200 Here's an interactive SageMath prompt:
202 \begin{tcblisting
}{listing only,
205 listing options=
{language=sage,style=sage
}}
206 sage: K = Cone(
[ (
1,
0), (
0,
1)
])
207 sage: K.positive_operator_gens()
209 [1 0] [0 1] [0 0] [0 0]
210 [0 0],
[0 0],
[1 0],
[0 1]
214 However, the smart way to display a SageMath listing is to load it
215 from an external file (under the ``listings'' subdirectory):
217 \sagelisting{example
}
219 Keeping the listings in separate files makes it easy for the build
223 \begin{section
}{Miscellaneous
}
224 The cardinality of the set $X
\coloneqq \set{1,
2,
3}$ is $
\card{X
}
228 \begin{section
}{Proof by cases
}
231 There are two cases in the following proof.
234 The result should be self-evident once we have considered the
237 \begin{case
}[first case
]
238 Nothing happens in the first case.
240 \begin{case
}[second case
]
241 The same thing happens in the second case.
251 \renewcommand{\baselinestretch}{2}
253 Cases should display intelligently even when the
document is
260 \begin{case
}[first case
]
261 Nothing happens in the first case.
263 \begin{case
}[second case
]
264 The same thing happens in the second case.
271 \renewcommand{\baselinestretch}{1}
274 \begin{section
}{Theorems
}
308 \begin{section
}{Theorems (starred)
}
342 \begin{section
}{Topology
}
343 The interior of a set $X$ is $
\interior{X
}$. Its closure is
344 $
\closure{X
}$ and its boundary is $
\boundary{X
}$.
347 \setlength{\glslistdottedwidth}{.3\linewidth}
348 \setglossarystyle{listdotted
}
350 \printnoidxglossaries
352 \bibliographystyle{mjo
}
353 \bibliography{local-references
}