Metamath Proof Explorer

Theorem kqreg

Description: The Kolmogorov quotient of a regular space is regular. By regr1 it is also Hausdorff, so we can also say that a space is regular iff the Kolmogorov quotient is regular Hausdorff (T_3). (Contributed by Mario Carneiro, 25-Aug-2015)

		Ref	Expression
	Assertion	kqreg	$⊢ J \in Reg \leftrightarrow KQ (J) \in Reg$

Proof

Step	Hyp	Ref	Expression
1		regtop	$⊢ J \in Reg \to J \in Top$
2		toptopon2	$⊢ J \in Top \leftrightarrow J \in TopOn (⋃ J)$
3	1 2	sylib	$⊢ J \in Reg \to J \in TopOn (⋃ J)$
4		eqid	$⊢ (x \in ⋃ J ⟼ \{y \in J \| x \in y\}) = (x \in ⋃ J ⟼ \{y \in J \| x \in y\})$
5	4	kqreglem1	$⊢ (J \in TopOn (⋃ J) \land J \in Reg) \to KQ (J) \in Reg$
6	3 5	mpancom	$⊢ J \in Reg \to KQ (J) \in Reg$
7		regtop	$⊢ KQ (J) \in Reg \to KQ (J) \in Top$
8		kqtop	$⊢ J \in Top \leftrightarrow KQ (J) \in Top$
9	7 8	sylibr	$⊢ KQ (J) \in Reg \to J \in Top$
10	9 2	sylib	$⊢ KQ (J) \in Reg \to J \in TopOn (⋃ J)$
11	4	kqreglem2	$⊢ (J \in TopOn (⋃ J) \land KQ (J) \in Reg) \to J \in Reg$
12	10 11	mpancom	$⊢ KQ (J) \in Reg \to J \in Reg$
13	6 12	impbii	$⊢ J \in Reg \leftrightarrow KQ (J) \in Reg$