Authorea

Set theory


description
command
output


set brackets
\{1,2,3\}
\(\{1,2,3\}\)

element of
\in
\(\in\)

not an element of
\not\in
\(\not\in\)

subset of
\subset
\(\subset\)

subset of
\subseteq
\(\subseteq\)

not a subset of
\not\subset
\(\not\subset\)

contains
\supset
\(\supset\)

contains
\supseteq
\(\supseteq\)

union
\cup
\(\cup\)

intersection
\cap
\(\cap\)

big union
\bigcup_{n=1}^{10}A_n
\(\displaystyle\bigcup_{n=1}^{10}A_{n}\)

big intersection
\bigcap_{n=1}^{10}A_n
\(\displaystyle\bigcap_{n=1}^{10}A_{n}\)

empty set
\emptyset
\(\emptyset\)

power set
\mathcal{P}
\(\mathcal{P}\)

minimum
\min
\(\min\)

maximum
\max
\(\max\)

supremum
\sup
\(\sup\)

infimum
\inf
\(\inf\)

limit superior
\limsup
\(\limsup\)

limit inferior
\liminf
\(\liminf\)

closure
\overline{A}
\(\overline{A}\)

description	command	output
set brackets	`\{1,2,3\}`	\(\{1,2,3\}\)
element of	`\in`	\(\in\)
not an element of	`\not\in`	\(\not\in\)
subset of	`\subset`	\(\subset\)
subset of	`\subseteq`	\(\subseteq\)
not a subset of	`\not\subset`	\(\not\subset\)
contains	`\supset`	\(\supset\)
contains	`\supseteq`	\(\supseteq\)
union	`\cup`	\(\cup\)
intersection	`\cap`	\(\cap\)
big union	`\bigcup_{n=1}^{10}A_n`	\(\displaystyle\bigcup_{n=1}^{10}A_{n}\)
big intersection	`\bigcap_{n=1}^{10}A_n`	\(\displaystyle\bigcap_{n=1}^{10}A_{n}\)
empty set	`\emptyset`	\(\emptyset\)
power set	`\mathcal{P}`	\(\mathcal{P}\)
minimum	`\min`	\(\min\)
maximum	`\max`	\(\max\)
supremum	`\sup`	\(\sup\)
infimum	`\inf`	\(\inf\)
limit superior	`\limsup`	\(\limsup\)
limit inferior	`\liminf`	\(\liminf\)
closure	`\overline{A}`	\(\overline{A}\)