df-limits

Description: Define the class of all limit ordinals. (Contributed by Scott Fenton, 11-Apr-2012)

		Ref	Expression
	Assertion	df-limits	$⊢ 𝖫𝗂𝗆𝗂𝗍𝗌 = (On \cap 𝖥𝗂𝗑 𝖡𝗂𝗀𝖼𝗎𝗉) ∖ \{\emptyset\}$

Step	Hyp	Ref	Expression
0		climits	$class 𝖫𝗂𝗆𝗂𝗍𝗌$
1		con0	$class On$
2		cbigcup	$class 𝖡𝗂𝗀𝖼𝗎𝗉$
3	2	cfix	$class 𝖥𝗂𝗑 𝖡𝗂𝗀𝖼𝗎𝗉$
4	1 3	cin	$class (On \cap 𝖥𝗂𝗑 𝖡𝗂𝗀𝖼𝗎𝗉)$
5		c0	$class \emptyset$
6	5	csn	$class \{\emptyset\}$
7	4 6	cdif	$class ((On \cap 𝖥𝗂𝗑 𝖡𝗂𝗀𝖼𝗎𝗉) ∖ \{\emptyset\})$
8	0 7	wceq	$wff 𝖫𝗂𝗆𝗂𝗍𝗌 = (On \cap 𝖥𝗂𝗑 𝖡𝗂𝗀𝖼𝗎𝗉) ∖ \{\emptyset\}$

Metamath Proof Explorer