reusv3

Description: Two ways to express single-valuedness of a class expression C ( y ) . See reusv1 for the connection to uniqueness. (Contributed by NM, 27-Dec-2012)

	Ref	Expression
Hypotheses	reusv3.1	$⊢ y = z \to (φ \leftrightarrow ψ)$
	reusv3.2	$⊢ y = z \to C = D$
Assertion	reusv3	$⊢ \exists y \in B (φ \land C \in A) \to (\forall y \in B \forall z \in B ((φ \land ψ) \to C = D) \leftrightarrow \exists x \in A \forall y \in B (φ \to x = C))$

Proof

Step	Hyp	Ref	Expression
1		reusv3.1	$⊢ y = z \to (φ \leftrightarrow ψ)$
2		reusv3.2	$⊢ y = z \to C = D$
3	2	eleq1d	$⊢ y = z \to (C \in A \leftrightarrow D \in A)$
4	1 3	anbi12d	$⊢ y = z \to ((φ \land C \in A) \leftrightarrow (ψ \land D \in A))$
5	4	cbvrexvw	$⊢ \exists y \in B (φ \land C \in A) \leftrightarrow \exists z \in B (ψ \land D \in A)$
6		nfra2w	$⊢ Ⅎ z \forall y \in B \forall z \in B ((φ \land ψ) \to C = D)$
7		nfv	$⊢ Ⅎ z \exists x \in A \forall y \in B (φ \to x = C)$
8	6 7	nfim	$⊢ Ⅎ z (\forall y \in B \forall z \in B ((φ \land ψ) \to C = D) \to \exists x \in A \forall y \in B (φ \to x = C))$
9		risset	$⊢ D \in A \leftrightarrow \exists x \in A x = D$
10		ralcom	$⊢ \forall y \in B \forall z \in B ((φ \land ψ) \to C = D) \leftrightarrow \forall z \in B \forall y \in B ((φ \land ψ) \to C = D)$
11		impexp	$⊢ ((φ \land ψ) \to C = D) \leftrightarrow (φ \to (ψ \to C = D))$
12		bi2.04	$⊢ (φ \to (ψ \to C = D)) \leftrightarrow (ψ \to (φ \to C = D))$
13	11 12	bitri	$⊢ ((φ \land ψ) \to C = D) \leftrightarrow (ψ \to (φ \to C = D))$
14	13	ralbii	$⊢ \forall y \in B ((φ \land ψ) \to C = D) \leftrightarrow \forall y \in B (ψ \to (φ \to C = D))$
15		r19.21v	$⊢ \forall y \in B (ψ \to (φ \to C = D)) \leftrightarrow (ψ \to \forall y \in B (φ \to C = D))$
16	14 15	bitri	$⊢ \forall y \in B ((φ \land ψ) \to C = D) \leftrightarrow (ψ \to \forall y \in B (φ \to C = D))$
17	16	ralbii	$⊢ \forall z \in B \forall y \in B ((φ \land ψ) \to C = D) \leftrightarrow \forall z \in B (ψ \to \forall y \in B (φ \to C = D))$
18	10 17	bitri	$⊢ \forall y \in B \forall z \in B ((φ \land ψ) \to C = D) \leftrightarrow \forall z \in B (ψ \to \forall y \in B (φ \to C = D))$
19		rsp	$⊢ \forall z \in B (ψ \to \forall y \in B (φ \to C = D)) \to (z \in B \to (ψ \to \forall y \in B (φ \to C = D)))$
20	18 19	sylbi	$⊢ \forall y \in B \forall z \in B ((φ \land ψ) \to C = D) \to (z \in B \to (ψ \to \forall y \in B (φ \to C = D)))$
21	20	com3l	$⊢ z \in B \to (ψ \to (\forall y \in B \forall z \in B ((φ \land ψ) \to C = D) \to \forall y \in B (φ \to C = D)))$
22	21	imp31	$⊢ ((z \in B \land ψ) \land \forall y \in B \forall z \in B ((φ \land ψ) \to C = D)) \to \forall y \in B (φ \to C = D)$
23		eqeq1	$⊢ x = D \to (x = C \leftrightarrow D = C)$
24		eqcom	$⊢ D = C \leftrightarrow C = D$
25	23 24	bitrdi	$⊢ x = D \to (x = C \leftrightarrow C = D)$
26	25	imbi2d	$⊢ x = D \to ((φ \to x = C) \leftrightarrow (φ \to C = D))$
27	26	ralbidv	$⊢ x = D \to (\forall y \in B (φ \to x = C) \leftrightarrow \forall y \in B (φ \to C = D))$
28	22 27	syl5ibrcom	$⊢ ((z \in B \land ψ) \land \forall y \in B \forall z \in B ((φ \land ψ) \to C = D)) \to (x = D \to \forall y \in B (φ \to x = C))$
29	28	reximdv	$⊢ ((z \in B \land ψ) \land \forall y \in B \forall z \in B ((φ \land ψ) \to C = D)) \to (\exists x \in A x = D \to \exists x \in A \forall y \in B (φ \to x = C))$
30	29	ex	$⊢ (z \in B \land ψ) \to (\forall y \in B \forall z \in B ((φ \land ψ) \to C = D) \to (\exists x \in A x = D \to \exists x \in A \forall y \in B (φ \to x = C)))$
31	30	com23	$⊢ (z \in B \land ψ) \to (\exists x \in A x = D \to (\forall y \in B \forall z \in B ((φ \land ψ) \to C = D) \to \exists x \in A \forall y \in B (φ \to x = C)))$
32	9 31	biimtrid	$⊢ (z \in B \land ψ) \to (D \in A \to (\forall y \in B \forall z \in B ((φ \land ψ) \to C = D) \to \exists x \in A \forall y \in B (φ \to x = C)))$
33	32	expimpd	$⊢ z \in B \to ((ψ \land D \in A) \to (\forall y \in B \forall z \in B ((φ \land ψ) \to C = D) \to \exists x \in A \forall y \in B (φ \to x = C)))$
34	8 33	rexlimi	$⊢ \exists z \in B (ψ \land D \in A) \to (\forall y \in B \forall z \in B ((φ \land ψ) \to C = D) \to \exists x \in A \forall y \in B (φ \to x = C))$
35	5 34	sylbi	$⊢ \exists y \in B (φ \land C \in A) \to (\forall y \in B \forall z \in B ((φ \land ψ) \to C = D) \to \exists x \in A \forall y \in B (φ \to x = C))$
36	1 2	reusv3i	$⊢ \exists x \in A \forall y \in B (φ \to x = C) \to \forall y \in B \forall z \in B ((φ \land ψ) \to C = D)$
37	35 36	impbid1	$⊢ \exists y \in B (φ \land C \in A) \to (\forall y \in B \forall z \in B ((φ \land ψ) \to C = D) \leftrightarrow \exists x \in A \forall y \in B (φ \to x = C))$

Metamath Proof Explorer

Theorem reusv3

Proof