axacnd

Description: A version of the Axiom of Choice with no distinct variable conditions. (New usage is discouraged.) (Contributed by NM, 3-Jan-2002) (Proof shortened by Mario Carneiro, 10-Dec-2016)

		Ref	Expression
	Assertion	axacnd	$⊢ \exists x \forall y \forall z (\forall x (y \in z \land z \in w) \to \exists w \forall y (\exists w ((y \in z \land z \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w))$

Proof

Step	Hyp	Ref	Expression
1		axacndlem5	$⊢ \exists x \forall y \forall v (\forall x (y \in v \land v \in w) \to \exists w \forall y (\exists w ((y \in v \land v \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w))$
2		nfnae	$⊢ Ⅎ x \neg \forall z z = x$
3		nfnae	$⊢ Ⅎ x \neg \forall z z = y$
4		nfnae	$⊢ Ⅎ x \neg \forall z z = w$
5	2 3 4	nf3an	$⊢ Ⅎ x (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w)$
6		nfnae	$⊢ Ⅎ y \neg \forall z z = x$
7		nfnae	$⊢ Ⅎ y \neg \forall z z = y$
8		nfnae	$⊢ Ⅎ y \neg \forall z z = w$
9	6 7 8	nf3an	$⊢ Ⅎ y (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w)$
10		nfnae	$⊢ Ⅎ z \neg \forall z z = x$
11		nfnae	$⊢ Ⅎ z \neg \forall z z = y$
12		nfnae	$⊢ Ⅎ z \neg \forall z z = w$
13	10 11 12	nf3an	$⊢ Ⅎ z (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w)$
14		nfcvf	$⊢ \neg \forall z z = y \to \underline{Ⅎ} z y$
15	14	3ad2ant2	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to \underline{Ⅎ} z y$
16		nfcvd	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to \underline{Ⅎ} z v$
17	15 16	nfeld	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to Ⅎ z y \in v$
18		nfcvf	$⊢ \neg \forall z z = w \to \underline{Ⅎ} z w$
19	18	3ad2ant3	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to \underline{Ⅎ} z w$
20	16 19	nfeld	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to Ⅎ z v \in w$
21	17 20	nfand	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to Ⅎ z (y \in v \land v \in w)$
22	5 21	nfald	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to Ⅎ z \forall x (y \in v \land v \in w)$
23		nfnae	$⊢ Ⅎ w \neg \forall z z = x$
24		nfnae	$⊢ Ⅎ w \neg \forall z z = y$
25		nfnae	$⊢ Ⅎ w \neg \forall z z = w$
26	23 24 25	nf3an	$⊢ Ⅎ w (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w)$
27	15 19	nfeld	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to Ⅎ z y \in w$
28		nfcvf	$⊢ \neg \forall z z = x \to \underline{Ⅎ} z x$
29	28	3ad2ant1	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to \underline{Ⅎ} z x$
30	19 29	nfeld	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to Ⅎ z w \in x$
31	27 30	nfand	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to Ⅎ z (y \in w \land w \in x)$
32	21 31	nfand	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to Ⅎ z ((y \in v \land v \in w) \land (y \in w \land w \in x))$
33	26 32	nfexd	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to Ⅎ z \exists w ((y \in v \land v \in w) \land (y \in w \land w \in x))$
34	15 19	nfeqd	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to Ⅎ z y = w$
35	33 34	nfbid	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to Ⅎ z (\exists w ((y \in v \land v \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w)$
36	9 35	nfald	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to Ⅎ z \forall y (\exists w ((y \in v \land v \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w)$
37	26 36	nfexd	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to Ⅎ z \exists w \forall y (\exists w ((y \in v \land v \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w)$
38	22 37	nfimd	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to Ⅎ z (\forall x (y \in v \land v \in w) \to \exists w \forall y (\exists w ((y \in v \land v \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w))$
39		nfcvd	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to \underline{Ⅎ} x v$
40		nfcvf2	$⊢ \neg \forall z z = x \to \underline{Ⅎ} x z$
41	40	3ad2ant1	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to \underline{Ⅎ} x z$
42	39 41	nfeqd	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to Ⅎ x v = z$
43	5 42	nfan1	$⊢ Ⅎ x ((\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \land v = z)$
44		simpr	$⊢ ((\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \land v = z) \to v = z$
45	44	eleq2d	$⊢ ((\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \land v = z) \to (y \in v \leftrightarrow y \in z)$
46	44	eleq1d	$⊢ ((\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \land v = z) \to (v \in w \leftrightarrow z \in w)$
47	45 46	anbi12d	$⊢ ((\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \land v = z) \to ((y \in v \land v \in w) \leftrightarrow (y \in z \land z \in w))$
48	43 47	albid	$⊢ ((\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \land v = z) \to (\forall x (y \in v \land v \in w) \leftrightarrow \forall x (y \in z \land z \in w))$
49		nfcvd	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to \underline{Ⅎ} w v$
50		nfcvf2	$⊢ \neg \forall z z = w \to \underline{Ⅎ} w z$
51	50	3ad2ant3	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to \underline{Ⅎ} w z$
52	49 51	nfeqd	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to Ⅎ w v = z$
53	26 52	nfan1	$⊢ Ⅎ w ((\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \land v = z)$
54		nfcvd	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to \underline{Ⅎ} y v$
55		nfcvf2	$⊢ \neg \forall z z = y \to \underline{Ⅎ} y z$
56	55	3ad2ant2	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to \underline{Ⅎ} y z$
57	54 56	nfeqd	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to Ⅎ y v = z$
58	9 57	nfan1	$⊢ Ⅎ y ((\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \land v = z)$
59	47	anbi1d	$⊢ ((\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \land v = z) \to (((y \in v \land v \in w) \land (y \in w \land w \in x)) \leftrightarrow ((y \in z \land z \in w) \land (y \in w \land w \in x)))$
60	53 59	exbid	$⊢ ((\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \land v = z) \to (\exists w ((y \in v \land v \in w) \land (y \in w \land w \in x)) \leftrightarrow \exists w ((y \in z \land z \in w) \land (y \in w \land w \in x)))$
61	60	bibi1d	$⊢ ((\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \land v = z) \to ((\exists w ((y \in v \land v \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w) \leftrightarrow (\exists w ((y \in z \land z \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w))$
62	58 61	albid	$⊢ ((\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \land v = z) \to (\forall y (\exists w ((y \in v \land v \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w) \leftrightarrow \forall y (\exists w ((y \in z \land z \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w))$
63	53 62	exbid	$⊢ ((\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \land v = z) \to (\exists w \forall y (\exists w ((y \in v \land v \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w) \leftrightarrow \exists w \forall y (\exists w ((y \in z \land z \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w))$
64	48 63	imbi12d	$⊢ ((\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \land v = z) \to ((\forall x (y \in v \land v \in w) \to \exists w \forall y (\exists w ((y \in v \land v \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w)) \leftrightarrow (\forall x (y \in z \land z \in w) \to \exists w \forall y (\exists w ((y \in z \land z \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w)))$
65	64	ex	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to (v = z \to ((\forall x (y \in v \land v \in w) \to \exists w \forall y (\exists w ((y \in v \land v \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w)) \leftrightarrow (\forall x (y \in z \land z \in w) \to \exists w \forall y (\exists w ((y \in z \land z \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w))))$
66	13 38 65	cbvald	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to (\forall v (\forall x (y \in v \land v \in w) \to \exists w \forall y (\exists w ((y \in v \land v \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w)) \leftrightarrow \forall z (\forall x (y \in z \land z \in w) \to \exists w \forall y (\exists w ((y \in z \land z \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w)))$
67	9 66	albid	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to (\forall y \forall v (\forall x (y \in v \land v \in w) \to \exists w \forall y (\exists w ((y \in v \land v \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w)) \leftrightarrow \forall y \forall z (\forall x (y \in z \land z \in w) \to \exists w \forall y (\exists w ((y \in z \land z \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w)))$
68	5 67	exbid	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to (\exists x \forall y \forall v (\forall x (y \in v \land v \in w) \to \exists w \forall y (\exists w ((y \in v \land v \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w)) \leftrightarrow \exists x \forall y \forall z (\forall x (y \in z \land z \in w) \to \exists w \forall y (\exists w ((y \in z \land z \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w)))$
69	1 68	mpbii	$⊢ (\neg \forall z z = x \land \neg \forall z z = y \land \neg \forall z z = w) \to \exists x \forall y \forall z (\forall x (y \in z \land z \in w) \to \exists w \forall y (\exists w ((y \in z \land z \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w))$
70	69	3exp	$⊢ \neg \forall z z = x \to (\neg \forall z z = y \to (\neg \forall z z = w \to \exists x \forall y \forall z (\forall x (y \in z \land z \in w) \to \exists w \forall y (\exists w ((y \in z \land z \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w))))$
71		axacndlem2	$⊢ \forall x x = z \to \exists x \forall y \forall z (\forall x (y \in z \land z \in w) \to \exists w \forall y (\exists w ((y \in z \land z \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w))$
72	71	aecoms	$⊢ \forall z z = x \to \exists x \forall y \forall z (\forall x (y \in z \land z \in w) \to \exists w \forall y (\exists w ((y \in z \land z \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w))$
73		axacndlem3	$⊢ \forall y y = z \to \exists x \forall y \forall z (\forall x (y \in z \land z \in w) \to \exists w \forall y (\exists w ((y \in z \land z \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w))$
74	73	aecoms	$⊢ \forall z z = y \to \exists x \forall y \forall z (\forall x (y \in z \land z \in w) \to \exists w \forall y (\exists w ((y \in z \land z \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w))$
75		nfae	$⊢ Ⅎ y \forall z z = w$
76		simpr	$⊢ (y \in z \land z \in w) \to z \in w$
77	76	alimi	$⊢ \forall x (y \in z \land z \in w) \to \forall x z \in w$
78		nd3	$⊢ \forall z z = w \to \neg \forall x z \in w$
79	78	pm2.21d	$⊢ \forall z z = w \to (\forall x z \in w \to \exists w \forall y (\exists w ((y \in z \land z \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w))$
80	77 79	syl5	$⊢ \forall z z = w \to (\forall x (y \in z \land z \in w) \to \exists w \forall y (\exists w ((y \in z \land z \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w))$
81	80	axc4i	$⊢ \forall z z = w \to \forall z (\forall x (y \in z \land z \in w) \to \exists w \forall y (\exists w ((y \in z \land z \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w))$
82	75 81	alrimi	$⊢ \forall z z = w \to \forall y \forall z (\forall x (y \in z \land z \in w) \to \exists w \forall y (\exists w ((y \in z \land z \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w))$
83	82	19.8ad	$⊢ \forall z z = w \to \exists x \forall y \forall z (\forall x (y \in z \land z \in w) \to \exists w \forall y (\exists w ((y \in z \land z \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w))$
84	70 72 74 83	pm2.61iii	$⊢ \exists x \forall y \forall z (\forall x (y \in z \land z \in w) \to \exists w \forall y (\exists w ((y \in z \land z \in w) \land (y \in w \land w \in x)) \leftrightarrow y = w))$

Metamath Proof Explorer

Theorem axacnd

Proof