petidres

Description: A class is a partition by identity class restricted to it if and only if the cosets by the restricted identity class are in equivalence relation on it, cf. eqvrel1cossidres . (Contributed by Peter Mazsa, 31-Dec-2021)

		Ref	Expression
	Assertion	petidres	$⊢ ({I ↾}_{A}) Part A \leftrightarrow ≀ ({I ↾}_{A}) ErALTV A$

Proof

Step	Hyp	Ref	Expression
1		petidres2	$⊢ (Disj ({I ↾}_{A}) \land dom ({I ↾}_{A}) / ({I ↾}_{A}) = A) \leftrightarrow (EqvRel ≀ ({I ↾}_{A}) \land dom ≀ ({I ↾}_{A}) / ≀ ({I ↾}_{A}) = A)$
2		dfpart2	$⊢ ({I ↾}_{A}) Part A \leftrightarrow (Disj ({I ↾}_{A}) \land dom ({I ↾}_{A}) / ({I ↾}_{A}) = A)$
3		dferALTV2	$⊢ ≀ ({I ↾}_{A}) ErALTV A \leftrightarrow (EqvRel ≀ ({I ↾}_{A}) \land dom ≀ ({I ↾}_{A}) / ≀ ({I ↾}_{A}) = A)$
4	1 2 3	3bitr4i	$⊢ ({I ↾}_{A}) Part A \leftrightarrow ≀ ({I ↾}_{A}) ErALTV A$

Metamath Proof Explorer

Theorem petidres

Proof