eu6lem

Description: Lemma of eu6im . A dissection of an idiom characterizing existential uniqueness. (Contributed by NM, 12-Aug-1993) This used to be the definition of the unique existential quantifier, while df-eu was then proved as dfeu . (Revised by BJ, 30-Sep-2022) (Proof shortened by Wolf Lammen, 3-Jan-2023) Extract common proof lines. (Revised by Wolf Lammen, 3-Mar-2023)

		Ref	Expression
	Assertion	eu6lem	$⊢ \exists y \forall x (φ \leftrightarrow x = y) \leftrightarrow (\exists y \forall x (x = y \to φ) \land \exists z \forall x (φ \to x = z))$

Proof

Step	Hyp	Ref	Expression
1		19.42v	$⊢ \exists z (\forall x (φ \leftrightarrow x = y) \land y = z) \leftrightarrow (\forall x (φ \leftrightarrow x = y) \land \exists z y = z)$
2		alsyl	$⊢ (\forall x (x = y \to φ) \land \forall x (φ \to x = z)) \to \forall x (x = y \to x = z)$
3		equvelv	$⊢ \forall x (x = y \to x = z) \leftrightarrow y = z$
4	2 3	sylib	$⊢ (\forall x (x = y \to φ) \land \forall x (φ \to x = z)) \to y = z$
5	4	pm4.71i	$⊢ (\forall x (x = y \to φ) \land \forall x (φ \to x = z)) \leftrightarrow ((\forall x (x = y \to φ) \land \forall x (φ \to x = z)) \land y = z)$
6		albiim	$⊢ \forall x (φ \leftrightarrow x = y) \leftrightarrow (\forall x (φ \to x = y) \land \forall x (x = y \to φ))$
7	6	biancomi	$⊢ \forall x (φ \leftrightarrow x = y) \leftrightarrow (\forall x (x = y \to φ) \land \forall x (φ \to x = y))$
8		equequ2	$⊢ y = z \to (x = y \leftrightarrow x = z)$
9	8	imbi2d	$⊢ y = z \to ((φ \to x = y) \leftrightarrow (φ \to x = z))$
10	9	albidv	$⊢ y = z \to (\forall x (φ \to x = y) \leftrightarrow \forall x (φ \to x = z))$
11	10	anbi2d	$⊢ y = z \to ((\forall x (x = y \to φ) \land \forall x (φ \to x = y)) \leftrightarrow (\forall x (x = y \to φ) \land \forall x (φ \to x = z)))$
12	7 11	syl5bb	$⊢ y = z \to (\forall x (φ \leftrightarrow x = y) \leftrightarrow (\forall x (x = y \to φ) \land \forall x (φ \to x = z)))$
13	12	pm5.32ri	$⊢ (\forall x (φ \leftrightarrow x = y) \land y = z) \leftrightarrow ((\forall x (x = y \to φ) \land \forall x (φ \to x = z)) \land y = z)$
14	5 13	bitr4i	$⊢ (\forall x (x = y \to φ) \land \forall x (φ \to x = z)) \leftrightarrow (\forall x (φ \leftrightarrow x = y) \land y = z)$
15	14	exbii	$⊢ \exists z (\forall x (x = y \to φ) \land \forall x (φ \to x = z)) \leftrightarrow \exists z (\forall x (φ \leftrightarrow x = y) \land y = z)$
16		ax6evr	$⊢ \exists z y = z$
17	16	biantru	$⊢ \forall x (φ \leftrightarrow x = y) \leftrightarrow (\forall x (φ \leftrightarrow x = y) \land \exists z y = z)$
18	1 15 17	3bitr4ri	$⊢ \forall x (φ \leftrightarrow x = y) \leftrightarrow \exists z (\forall x (x = y \to φ) \land \forall x (φ \to x = z))$
19	18	exbii	$⊢ \exists y \forall x (φ \leftrightarrow x = y) \leftrightarrow \exists y \exists z (\forall x (x = y \to φ) \land \forall x (φ \to x = z))$
20		exdistrv	$⊢ \exists y \exists z (\forall x (x = y \to φ) \land \forall x (φ \to x = z)) \leftrightarrow (\exists y \forall x (x = y \to φ) \land \exists z \forall x (φ \to x = z))$
21	19 20	bitri	$⊢ \exists y \forall x (φ \leftrightarrow x = y) \leftrightarrow (\exists y \forall x (x = y \to φ) \land \exists z \forall x (φ \to x = z))$

Metamath Proof Explorer

Theorem eu6lem

Proof