eqvreldmqs2

Description: Two ways to express comember equivalence relation on its domain quotient. (Contributed by Peter Mazsa, 30-Dec-2024)

		Ref	Expression
	Assertion	eqvreldmqs2	$⊢ (EqvRel ≀ ({E^{-1} ↾}_{A}) \land dom ≀ ({E^{-1} ↾}_{A}) / ≀ ({E^{-1} ↾}_{A}) = A) \leftrightarrow (EqvRel \sim A \land ⋃ A / \sim A = A)$

Step	Hyp	Ref	Expression
1		df-coels	$⊢ \sim A = ≀ ({E^{-1} ↾}_{A})$
2	1	eqvreleqi	$⊢ EqvRel \sim A \leftrightarrow EqvRel ≀ ({E^{-1} ↾}_{A})$
3	2	bicomi	$⊢ EqvRel ≀ ({E^{-1} ↾}_{A}) \leftrightarrow EqvRel \sim A$
4		dmqs1cosscnvepreseq	$⊢ dom ≀ ({E^{-1} ↾}_{A}) / ≀ ({E^{-1} ↾}_{A}) = A \leftrightarrow ⋃ A / \sim A = A$
5	3 4	anbi12i	$⊢ (EqvRel ≀ ({E^{-1} ↾}_{A}) \land dom ≀ ({E^{-1} ↾}_{A}) / ≀ ({E^{-1} ↾}_{A}) = A) \leftrightarrow (EqvRel \sim A \land ⋃ A / \sim A = A)$

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