snsn0non

Description: The singleton of the singleton of the empty set is not an ordinal (nor a natural number by omsson ). It can be used to represent an "undefined" value for a partial operation on natural or ordinal numbers. See also onxpdisj . (Contributed by NM, 21-May-2004) (Proof shortened by Andrew Salmon, 12-Aug-2011)

		Ref	Expression
	Assertion	snsn0non	$⊢ \neg \{\{\emptyset\}\} \in On$

Proof

Step	Hyp	Ref	Expression
1		snex	$⊢ \{\emptyset\} \in V$
2	1	snid	$⊢ \{\emptyset\} \in \{\{\emptyset\}\}$
3	2	n0ii	$⊢ \neg \{\{\emptyset\}\} = \emptyset$
4		0ex	$⊢ \emptyset \in V$
5	4	snid	$⊢ \emptyset \in \{\emptyset\}$
6	5	n0ii	$⊢ \neg \{\emptyset\} = \emptyset$
7		eqcom	$⊢ \emptyset = \{\emptyset\} \leftrightarrow \{\emptyset\} = \emptyset$
8	6 7	mtbir	$⊢ \neg \emptyset = \{\emptyset\}$
9	4	elsn	$⊢ \emptyset \in \{\{\emptyset\}\} \leftrightarrow \emptyset = \{\emptyset\}$
10	8 9	mtbir	$⊢ \neg \emptyset \in \{\{\emptyset\}\}$
11	3 10	pm3.2ni	$⊢ \neg (\{\{\emptyset\}\} = \emptyset \lor \emptyset \in \{\{\emptyset\}\})$
12		on0eqel	$⊢ \{\{\emptyset\}\} \in On \to (\{\{\emptyset\}\} = \emptyset \lor \emptyset \in \{\{\emptyset\}\})$
13	11 12	mto	$⊢ \neg \{\{\emptyset\}\} \in On$

Metamath Proof Explorer

Theorem snsn0non

Proof