carduni

Description: The union of a set of cardinals is a cardinal. Theorem 18.14 of Monk1 p. 133. (Contributed by Mario Carneiro, 20-Jan-2013)

		Ref	Expression
	Assertion	carduni	$⊢ A \in V \to (\forall x \in A card (x) = x \to card (⋃ A) = ⋃ A)$

Proof

Step	Hyp	Ref	Expression
1		ssonuni	$⊢ A \in V \to (A \subseteq On \to ⋃ A \in On)$
2		fveq2	$⊢ x = y \to card (x) = card (y)$
3		id	$⊢ x = y \to x = y$
4	2 3	eqeq12d	$⊢ x = y \to (card (x) = x \leftrightarrow card (y) = y)$
5	4	rspcv	$⊢ y \in A \to (\forall x \in A card (x) = x \to card (y) = y)$
6		cardon	$⊢ card (y) \in On$
7		eleq1	$⊢ card (y) = y \to (card (y) \in On \leftrightarrow y \in On)$
8	6 7	mpbii	$⊢ card (y) = y \to y \in On$
9	5 8	syl6com	$⊢ \forall x \in A card (x) = x \to (y \in A \to y \in On)$
10	9	ssrdv	$⊢ \forall x \in A card (x) = x \to A \subseteq On$
11	1 10	impel	$⊢ (A \in V \land \forall x \in A card (x) = x) \to ⋃ A \in On$
12		cardonle	$⊢ ⋃ A \in On \to card (⋃ A) \subseteq ⋃ A$
13	11 12	syl	$⊢ (A \in V \land \forall x \in A card (x) = x) \to card (⋃ A) \subseteq ⋃ A$
14		cardon	$⊢ card (⋃ A) \in On$
15	14	onirri	$⊢ \neg card (⋃ A) \in card (⋃ A)$
16		eluni	$⊢ card (⋃ A) \in ⋃ A \leftrightarrow \exists y (card (⋃ A) \in y \land y \in A)$
17		elssuni	$⊢ y \in A \to y \subseteq ⋃ A$
18		ssdomg	$⊢ ⋃ A \in On \to (y \subseteq ⋃ A \to y ≼ ⋃ A)$
19	18	adantl	$⊢ (card (y) = y \land ⋃ A \in On) \to (y \subseteq ⋃ A \to y ≼ ⋃ A)$
20	17 19	syl5	$⊢ (card (y) = y \land ⋃ A \in On) \to (y \in A \to y ≼ ⋃ A)$
21		id	$⊢ card (y) = y \to card (y) = y$
22		onenon	$⊢ card (y) \in On \to card (y) \in dom card$
23	6 22	ax-mp	$⊢ card (y) \in dom card$
24	21 23	eqeltrrdi	$⊢ card (y) = y \to y \in dom card$
25		onenon	$⊢ ⋃ A \in On \to ⋃ A \in dom card$
26		carddom2	$⊢ (y \in dom card \land ⋃ A \in dom card) \to (card (y) \subseteq card (⋃ A) \leftrightarrow y ≼ ⋃ A)$
27	24 25 26	syl2an	$⊢ (card (y) = y \land ⋃ A \in On) \to (card (y) \subseteq card (⋃ A) \leftrightarrow y ≼ ⋃ A)$
28	20 27	sylibrd	$⊢ (card (y) = y \land ⋃ A \in On) \to (y \in A \to card (y) \subseteq card (⋃ A))$
29		sseq1	$⊢ card (y) = y \to (card (y) \subseteq card (⋃ A) \leftrightarrow y \subseteq card (⋃ A))$
30	29	adantr	$⊢ (card (y) = y \land ⋃ A \in On) \to (card (y) \subseteq card (⋃ A) \leftrightarrow y \subseteq card (⋃ A))$
31	28 30	sylibd	$⊢ (card (y) = y \land ⋃ A \in On) \to (y \in A \to y \subseteq card (⋃ A))$
32		ssel	$⊢ y \subseteq card (⋃ A) \to (card (⋃ A) \in y \to card (⋃ A) \in card (⋃ A))$
33	31 32	syl6	$⊢ (card (y) = y \land ⋃ A \in On) \to (y \in A \to (card (⋃ A) \in y \to card (⋃ A) \in card (⋃ A)))$
34	33	ex	$⊢ card (y) = y \to (⋃ A \in On \to (y \in A \to (card (⋃ A) \in y \to card (⋃ A) \in card (⋃ A))))$
35	34	com3r	$⊢ y \in A \to (card (y) = y \to (⋃ A \in On \to (card (⋃ A) \in y \to card (⋃ A) \in card (⋃ A))))$
36	5 35	syld	$⊢ y \in A \to (\forall x \in A card (x) = x \to (⋃ A \in On \to (card (⋃ A) \in y \to card (⋃ A) \in card (⋃ A))))$
37	36	com4r	$⊢ card (⋃ A) \in y \to (y \in A \to (\forall x \in A card (x) = x \to (⋃ A \in On \to card (⋃ A) \in card (⋃ A))))$
38	37	imp	$⊢ (card (⋃ A) \in y \land y \in A) \to (\forall x \in A card (x) = x \to (⋃ A \in On \to card (⋃ A) \in card (⋃ A)))$
39	38	exlimiv	$⊢ \exists y (card (⋃ A) \in y \land y \in A) \to (\forall x \in A card (x) = x \to (⋃ A \in On \to card (⋃ A) \in card (⋃ A)))$
40	16 39	sylbi	$⊢ card (⋃ A) \in ⋃ A \to (\forall x \in A card (x) = x \to (⋃ A \in On \to card (⋃ A) \in card (⋃ A)))$
41	40	com13	$⊢ ⋃ A \in On \to (\forall x \in A card (x) = x \to (card (⋃ A) \in ⋃ A \to card (⋃ A) \in card (⋃ A)))$
42	41	imp	$⊢ (⋃ A \in On \land \forall x \in A card (x) = x) \to (card (⋃ A) \in ⋃ A \to card (⋃ A) \in card (⋃ A))$
43	11 42	sylancom	$⊢ (A \in V \land \forall x \in A card (x) = x) \to (card (⋃ A) \in ⋃ A \to card (⋃ A) \in card (⋃ A))$
44	15 43	mtoi	$⊢ (A \in V \land \forall x \in A card (x) = x) \to \neg card (⋃ A) \in ⋃ A$
45	14	onordi	$⊢ Ord card (⋃ A)$
46		eloni	$⊢ ⋃ A \in On \to Ord ⋃ A$
47	11 46	syl	$⊢ (A \in V \land \forall x \in A card (x) = x) \to Ord ⋃ A$
48		ordtri4	$⊢ (Ord card (⋃ A) \land Ord ⋃ A) \to (card (⋃ A) = ⋃ A \leftrightarrow (card (⋃ A) \subseteq ⋃ A \land \neg card (⋃ A) \in ⋃ A))$
49	45 47 48	sylancr	$⊢ (A \in V \land \forall x \in A card (x) = x) \to (card (⋃ A) = ⋃ A \leftrightarrow (card (⋃ A) \subseteq ⋃ A \land \neg card (⋃ A) \in ⋃ A))$
50	13 44 49	mpbir2and	$⊢ (A \in V \land \forall x \in A card (x) = x) \to card (⋃ A) = ⋃ A$
51	50	ex	$⊢ A \in V \to (\forall x \in A card (x) = x \to card (⋃ A) = ⋃ A)$

Metamath Proof Explorer

Theorem carduni

Proof