axpowndlem3

Description: Lemma for the Axiom of Power Sets with no distinct variable conditions. Usage of this theorem is discouraged because it depends on ax-13 . (Contributed by NM, 4-Jan-2002) (Revised by Mario Carneiro, 10-Dec-2016) (Proof shortened by Wolf Lammen, 10-Jun-2019) (New usage is discouraged.)

		Ref	Expression
	Assertion	axpowndlem3	$⊢ \neg x = y \to \exists x \forall y (\forall x (\exists z x \in y \to \forall y x \in z) \to y \in x)$

Proof

Step	Hyp	Ref	Expression
1		sp	$⊢ \forall x x = y \to x = y$
2		p0ex	$⊢ \{\emptyset\} \in V$
3		eleq2	$⊢ x = \{\emptyset\} \to (w \in x \leftrightarrow w \in \{\emptyset\})$
4	3	imbi2d	$⊢ x = \{\emptyset\} \to ((w = \emptyset \to w \in x) \leftrightarrow (w = \emptyset \to w \in \{\emptyset\}))$
5	4	albidv	$⊢ x = \{\emptyset\} \to (\forall w (w = \emptyset \to w \in x) \leftrightarrow \forall w (w = \emptyset \to w \in \{\emptyset\}))$
6	2 5	spcev	$⊢ \forall w (w = \emptyset \to w \in \{\emptyset\}) \to \exists x \forall w (w = \emptyset \to w \in x)$
7		0ex	$⊢ \emptyset \in V$
8	7	snid	$⊢ \emptyset \in \{\emptyset\}$
9		eleq1	$⊢ w = \emptyset \to (w \in \{\emptyset\} \leftrightarrow \emptyset \in \{\emptyset\})$
10	8 9	mpbiri	$⊢ w = \emptyset \to w \in \{\emptyset\}$
11	6 10	mpg	$⊢ \exists x \forall w (w = \emptyset \to w \in x)$
12		neq0	$⊢ \neg w = \emptyset \leftrightarrow \exists x x \in w$
13	12	con1bii	$⊢ \neg \exists x x \in w \leftrightarrow w = \emptyset$
14	13	imbi1i	$⊢ (\neg \exists x x \in w \to w \in x) \leftrightarrow (w = \emptyset \to w \in x)$
15	14	albii	$⊢ \forall w (\neg \exists x x \in w \to w \in x) \leftrightarrow \forall w (w = \emptyset \to w \in x)$
16	15	exbii	$⊢ \exists x \forall w (\neg \exists x x \in w \to w \in x) \leftrightarrow \exists x \forall w (w = \emptyset \to w \in x)$
17	11 16	mpbir	$⊢ \exists x \forall w (\neg \exists x x \in w \to w \in x)$
18		nfnae	$⊢ Ⅎ x \neg \forall x x = y$
19		nfnae	$⊢ Ⅎ y \neg \forall x x = y$
20		nfcvf2	$⊢ \neg \forall x x = y \to \underline{Ⅎ} y x$
21		nfcvd	$⊢ \neg \forall x x = y \to \underline{Ⅎ} y w$
22	20 21	nfeld	$⊢ \neg \forall x x = y \to Ⅎ y x \in w$
23	18 22	nfexd	$⊢ \neg \forall x x = y \to Ⅎ y \exists x x \in w$
24	23	nfnd	$⊢ \neg \forall x x = y \to Ⅎ y \neg \exists x x \in w$
25	21 20	nfeld	$⊢ \neg \forall x x = y \to Ⅎ y w \in x$
26	24 25	nfimd	$⊢ \neg \forall x x = y \to Ⅎ y (\neg \exists x x \in w \to w \in x)$
27		nfeqf2	$⊢ \neg \forall x x = y \to Ⅎ x w = y$
28	18 27	nfan1	$⊢ Ⅎ x (\neg \forall x x = y \land w = y)$
29		elequ2	$⊢ w = y \to (x \in w \leftrightarrow x \in y)$
30	29	adantl	$⊢ (\neg \forall x x = y \land w = y) \to (x \in w \leftrightarrow x \in y)$
31	28 30	exbid	$⊢ (\neg \forall x x = y \land w = y) \to (\exists x x \in w \leftrightarrow \exists x x \in y)$
32	31	notbid	$⊢ (\neg \forall x x = y \land w = y) \to (\neg \exists x x \in w \leftrightarrow \neg \exists x x \in y)$
33		elequ1	$⊢ w = y \to (w \in x \leftrightarrow y \in x)$
34	33	adantl	$⊢ (\neg \forall x x = y \land w = y) \to (w \in x \leftrightarrow y \in x)$
35	32 34	imbi12d	$⊢ (\neg \forall x x = y \land w = y) \to ((\neg \exists x x \in w \to w \in x) \leftrightarrow (\neg \exists x x \in y \to y \in x))$
36	35	ex	$⊢ \neg \forall x x = y \to (w = y \to ((\neg \exists x x \in w \to w \in x) \leftrightarrow (\neg \exists x x \in y \to y \in x)))$
37	19 26 36	cbvald	$⊢ \neg \forall x x = y \to (\forall w (\neg \exists x x \in w \to w \in x) \leftrightarrow \forall y (\neg \exists x x \in y \to y \in x))$
38	18 37	exbid	$⊢ \neg \forall x x = y \to (\exists x \forall w (\neg \exists x x \in w \to w \in x) \leftrightarrow \exists x \forall y (\neg \exists x x \in y \to y \in x))$
39	17 38	mpbii	$⊢ \neg \forall x x = y \to \exists x \forall y (\neg \exists x x \in y \to y \in x)$
40		nfae	$⊢ Ⅎ x \forall x x = z$
41		nfae	$⊢ Ⅎ y \forall x x = z$
42		axc11r	$⊢ \forall x x = z \to (\forall z \neg x \in y \to \forall x \neg x \in y)$
43		alnex	$⊢ \forall z \neg x \in y \leftrightarrow \neg \exists z x \in y$
44		alnex	$⊢ \forall x \neg x \in y \leftrightarrow \neg \exists x x \in y$
45	42 43 44	3imtr3g	$⊢ \forall x x = z \to (\neg \exists z x \in y \to \neg \exists x x \in y)$
46		nd3	$⊢ \forall x x = z \to \neg \forall y x \in z$
47	46	pm2.21d	$⊢ \forall x x = z \to (\forall y x \in z \to \neg \exists x x \in y)$
48	45 47	jad	$⊢ \forall x x = z \to ((\exists z x \in y \to \forall y x \in z) \to \neg \exists x x \in y)$
49	48	spsd	$⊢ \forall x x = z \to (\forall x (\exists z x \in y \to \forall y x \in z) \to \neg \exists x x \in y)$
50	49	imim1d	$⊢ \forall x x = z \to ((\neg \exists x x \in y \to y \in x) \to (\forall x (\exists z x \in y \to \forall y x \in z) \to y \in x))$
51	41 50	alimd	$⊢ \forall x x = z \to (\forall y (\neg \exists x x \in y \to y \in x) \to \forall y (\forall x (\exists z x \in y \to \forall y x \in z) \to y \in x))$
52	40 51	eximd	$⊢ \forall x x = z \to (\exists x \forall y (\neg \exists x x \in y \to y \in x) \to \exists x \forall y (\forall x (\exists z x \in y \to \forall y x \in z) \to y \in x))$
53	39 52	syl5com	$⊢ \neg \forall x x = y \to (\forall x x = z \to \exists x \forall y (\forall x (\exists z x \in y \to \forall y x \in z) \to y \in x))$
54		axpowndlem2	$⊢ \neg \forall x x = y \to (\neg \forall x x = z \to \exists x \forall y (\forall x (\exists z x \in y \to \forall y x \in z) \to y \in x))$
55	53 54	pm2.61d	$⊢ \neg \forall x x = y \to \exists x \forall y (\forall x (\exists z x \in y \to \forall y x \in z) \to y \in x)$
56	1 55	nsyl5	$⊢ \neg x = y \to \exists x \forall y (\forall x (\exists z x \in y \to \forall y x \in z) \to y \in x)$

Metamath Proof Explorer

Theorem axpowndlem3

Proof