Metamath Proof Explorer

Theorem dfeumo

Description: An elementary proof showing the reverse direction of dfmoeu . Here the characterizing expression of existential uniqueness ( eu6 ) is derived from that of uniqueness ( df-mo ). (Contributed by Wolf Lammen, 3-Oct-2023)

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

Proof

Step	Hyp	Ref	Expression
1		ax6ev	$⊢ \exists x x = y$
2		biimpr	$⊢ (φ \leftrightarrow x = y) \to (x = y \to φ)$
3	2	aleximi	$⊢ \forall x (φ \leftrightarrow x = y) \to (\exists x x = y \to \exists x φ)$
4	1 3	mpi	$⊢ \forall x (φ \leftrightarrow x = y) \to \exists x φ$
5	4	exlimiv	$⊢ \exists y \forall x (φ \leftrightarrow x = y) \to \exists x φ$
6	5	pm4.71ri	$⊢ \exists y \forall x (φ \leftrightarrow x = y) \leftrightarrow (\exists x φ \land \exists y \forall x (φ \leftrightarrow x = y))$
7		abai	$⊢ (\exists x φ \land \exists y \forall x (φ \leftrightarrow x = y)) \leftrightarrow (\exists x φ \land (\exists x φ \to \exists y \forall x (φ \leftrightarrow x = y)))$
8		dfmoeu	$⊢ (\exists x φ \to \exists y \forall x (φ \leftrightarrow x = y)) \leftrightarrow \exists y \forall x (φ \to x = y)$
9	8	anbi2i	$⊢ (\exists x φ \land (\exists x φ \to \exists y \forall x (φ \leftrightarrow x = y))) \leftrightarrow (\exists x φ \land \exists y \forall x (φ \to x = y))$
10	6 7 9	3bitrri	$⊢ (\exists x φ \land \exists y \forall x (φ \to x = y)) \leftrightarrow \exists y \forall x (φ \leftrightarrow x = y)$