axpowg3

Description: A generalization of ax-pow that combines axpowg and axpowg2 into a single theorem scheme. Unlike ax-pow , this scheme lacks a distinct variable condition for y and w as well as for x and w . Usage of this theorem is discouraged because it depends on ax-13 . (Contributed by BTernaryTau, 26-May-2026) (New usage is discouraged.)

		Ref	Expression
	Assertion	axpowg3	$⊢ \exists y \forall z (\forall w (w \in z \to w \in x) \to z \in y)$

Proof

Step	Hyp	Ref	Expression
1		nfnae	$⊢ Ⅎ y \neg \forall x x = w$
2		nfv	$⊢ Ⅎ z \neg \forall x x = w$
3		nfnae	$⊢ Ⅎ w \neg \forall x x = w$
4		nfcvf	$⊢ \neg \forall x x = w \to \underline{Ⅎ} x w$
5		nfcvd	$⊢ \neg \forall x x = w \to \underline{Ⅎ} x z$
6	4 5	nfeld	$⊢ \neg \forall x x = w \to Ⅎ x w \in z$
7		nfcvd	$⊢ \neg \forall x x = w \to \underline{Ⅎ} x v$
8	4 7	nfeld	$⊢ \neg \forall x x = w \to Ⅎ x w \in v$
9	6 8	nfimd	$⊢ \neg \forall x x = w \to Ⅎ x (w \in z \to w \in v)$
10	3 9	nfald	$⊢ \neg \forall x x = w \to Ⅎ x \forall w (w \in z \to w \in v)$
11		nfvd	$⊢ \neg \forall x x = w \to Ⅎ x z \in y$
12	10 11	nfimd	$⊢ \neg \forall x x = w \to Ⅎ x (\forall w (w \in z \to w \in v) \to z \in y)$
13	2 12	nfald	$⊢ \neg \forall x x = w \to Ⅎ x \forall z (\forall w (w \in z \to w \in v) \to z \in y)$
14	1 13	nfexd	$⊢ \neg \forall x x = w \to Ⅎ x \exists y \forall z (\forall w (w \in z \to w \in v) \to z \in y)$
15		nfvd	$⊢ \neg \forall x x = w \to Ⅎ v \exists y \forall z (\forall w (w \in z \to w \in x) \to z \in y)$
16		dveeq2	$⊢ \neg \forall w w = x \to (v = x \to \forall w v = x)$
17	16	naecoms	$⊢ \neg \forall x x = w \to (v = x \to \forall w v = x)$
18		nfv	$⊢ Ⅎ y v = x$
19	18	nfal	$⊢ Ⅎ y \forall w v = x$
20		ax9v2	$⊢ x = v \to (w \in x \to w \in v)$
21	20	equcoms	$⊢ v = x \to (w \in x \to w \in v)$
22	21	imim2d	$⊢ v = x \to ((w \in z \to w \in x) \to (w \in z \to w \in v))$
23	22	al2imi	$⊢ \forall w v = x \to (\forall w (w \in z \to w \in x) \to \forall w (w \in z \to w \in v))$
24	23	imim1d	$⊢ \forall w v = x \to ((\forall w (w \in z \to w \in v) \to z \in y) \to (\forall w (w \in z \to w \in x) \to z \in y))$
25	24	alimdv	$⊢ \forall w v = x \to (\forall z (\forall w (w \in z \to w \in v) \to z \in y) \to \forall z (\forall w (w \in z \to w \in x) \to z \in y))$
26	19 25	eximd	$⊢ \forall w v = x \to (\exists y \forall z (\forall w (w \in z \to w \in v) \to z \in y) \to \exists y \forall z (\forall w (w \in z \to w \in x) \to z \in y))$
27	17 26	syl6	$⊢ \neg \forall x x = w \to (v = x \to (\exists y \forall z (\forall w (w \in z \to w \in v) \to z \in y) \to \exists y \forall z (\forall w (w \in z \to w \in x) \to z \in y)))$
28		nfae	$⊢ Ⅎ y \forall x x = w$
29		axc11r	$⊢ \forall x x = w \to (\forall w (w \in z \to w \in x) \to \forall x (w \in z \to w \in x))$
30		ax8	$⊢ x = w \to (x \in z \to w \in z)$
31		ax8	$⊢ w = x \to (w \in x \to x \in x)$
32	31	equcoms	$⊢ x = w \to (w \in x \to x \in x)$
33	30 32	imim12d	$⊢ x = w \to ((w \in z \to w \in x) \to (x \in z \to x \in x))$
34	33	al2imi	$⊢ \forall x x = w \to (\forall x (w \in z \to w \in x) \to \forall x (x \in z \to x \in x))$
35	29 34	syld	$⊢ \forall x x = w \to (\forall w (w \in z \to w \in x) \to \forall x (x \in z \to x \in x))$
36	35	imim1d	$⊢ \forall x x = w \to ((\forall x (x \in z \to x \in x) \to z \in y) \to (\forall w (w \in z \to w \in x) \to z \in y))$
37	36	alimdv	$⊢ \forall x x = w \to (\forall z (\forall x (x \in z \to x \in x) \to z \in y) \to \forall z (\forall w (w \in z \to w \in x) \to z \in y))$
38	28 37	eximd	$⊢ \forall x x = w \to (\exists y \forall z (\forall x (x \in z \to x \in x) \to z \in y) \to \exists y \forall z (\forall w (w \in z \to w \in x) \to z \in y))$
39		axpowg	$⊢ \exists y \forall z (\forall w (w \in z \to w \in v) \to z \in y)$
40	39	ax-gen	$⊢ \forall v \exists y \forall z (\forall w (w \in z \to w \in v) \to z \in y)$
41		axprlem1	$⊢ \exists y \forall z (\forall x \neg x \in z \to z \in y)$
42		elirrv	$⊢ \neg x \in x$
43		mtt	$⊢ \neg x \in x \to (\neg x \in z \leftrightarrow (x \in z \to x \in x))$
44	42 43	ax-mp	$⊢ \neg x \in z \leftrightarrow (x \in z \to x \in x)$
45	44	biimpri	$⊢ (x \in z \to x \in x) \to \neg x \in z$
46	45	alimi	$⊢ \forall x (x \in z \to x \in x) \to \forall x \neg x \in z$
47	46	imim1i	$⊢ (\forall x \neg x \in z \to z \in y) \to (\forall x (x \in z \to x \in x) \to z \in y)$
48	47	alimi	$⊢ \forall z (\forall x \neg x \in z \to z \in y) \to \forall z (\forall x (x \in z \to x \in x) \to z \in y)$
49	41 48	eximii	$⊢ \exists y \forall z (\forall x (x \in z \to x \in x) \to z \in y)$
50	49	ax-gen	$⊢ \forall x \exists y \forall z (\forall x (x \in z \to x \in x) \to z \in y)$
51	14 15 27 38 40 50	dvelimalcasei	$⊢ \forall x \exists y \forall z (\forall w (w \in z \to w \in x) \to z \in y)$
52	51	spi	$⊢ \exists y \forall z (\forall w (w \in z \to w \in x) \to z \in y)$

Metamath Proof Explorer

Theorem axpowg3

Proof