Metamath Proof Explorer

Theorem 2reu4

Description: Definition of double restricted existential uniqueness ("exactly one x and exactly one y "), analogous to 2eu4 . (Contributed by Alexander van der Vekens, 1-Jul-2017)

		Ref	Expression
	Assertion	2reu4	$⊢ (\exists! x \in A \exists y \in B φ \land \exists! y \in B \exists x \in A φ) \leftrightarrow (\exists x \in A \exists y \in B φ \land \exists z \in A \exists w \in B \forall x \in A \forall y \in B (φ \to (x = z \land y = w)))$

Proof

Step	Hyp	Ref	Expression
1		reurex	$⊢ \exists! x \in A \exists y \in B φ \to \exists x \in A \exists y \in B φ$
2		rexn0	$⊢ \exists x \in A \exists y \in B φ \to A \neq \emptyset$
3	1 2	syl	$⊢ \exists! x \in A \exists y \in B φ \to A \neq \emptyset$
4		reurex	$⊢ \exists! y \in B \exists x \in A φ \to \exists y \in B \exists x \in A φ$
5		rexn0	$⊢ \exists y \in B \exists x \in A φ \to B \neq \emptyset$
6	4 5	syl	$⊢ \exists! y \in B \exists x \in A φ \to B \neq \emptyset$
7	3 6	anim12i	$⊢ (\exists! x \in A \exists y \in B φ \land \exists! y \in B \exists x \in A φ) \to (A \neq \emptyset \land B \neq \emptyset)$
8		ne0i	$⊢ x \in A \to A \neq \emptyset$
9		ne0i	$⊢ y \in B \to B \neq \emptyset$
10	8 9	anim12i	$⊢ (x \in A \land y \in B) \to (A \neq \emptyset \land B \neq \emptyset)$
11	10	a1d	$⊢ (x \in A \land y \in B) \to (φ \to (A \neq \emptyset \land B \neq \emptyset))$
12	11	rexlimivv	$⊢ \exists x \in A \exists y \in B φ \to (A \neq \emptyset \land B \neq \emptyset)$
13	12	adantr	$⊢ (\exists x \in A \exists y \in B φ \land \exists z \in A \exists w \in B \forall x \in A \forall y \in B (φ \to (x = z \land y = w))) \to (A \neq \emptyset \land B \neq \emptyset)$
14		2reu4lem	$⊢ (A \neq \emptyset \land B \neq \emptyset) \to ((\exists! x \in A \exists y \in B φ \land \exists! y \in B \exists x \in A φ) \leftrightarrow (\exists x \in A \exists y \in B φ \land \exists z \in A \exists w \in B \forall x \in A \forall y \in B (φ \to (x = z \land y = w))))$
15	7 13 14	pm5.21nii	$⊢ (\exists! x \in A \exists y \in B φ \land \exists! y \in B \exists x \in A φ) \leftrightarrow (\exists x \in A \exists y \in B φ \land \exists z \in A \exists w \in B \forall x \in A \forall y \in B (φ \to (x = z \land y = w)))$