Metamath Proof Explorer

Theorem nrmsep2

Description: In a normal space, any two disjoint closed sets have the property that each one is a subset of an open set whose closure is disjoint from the other. (Contributed by Jeff Hankins, 1-Feb-2010) (Revised by Mario Carneiro, 24-Aug-2015)

		Ref	Expression
	Assertion	nrmsep2	$⊢ (J \in Nrm \land (C \in Clsd (J) \land D \in Clsd (J) \land C \cap D = \emptyset)) \to \exists x \in J (C \subseteq x \land cls (J) (x) \cap D = \emptyset)$

Proof

Step	Hyp	Ref	Expression
1		simpl	$⊢ (J \in Nrm \land (C \in Clsd (J) \land D \in Clsd (J) \land C \cap D = \emptyset)) \to J \in Nrm$
2		simpr2	$⊢ (J \in Nrm \land (C \in Clsd (J) \land D \in Clsd (J) \land C \cap D = \emptyset)) \to D \in Clsd (J)$
3		eqid	$⊢ ⋃ J = ⋃ J$
4	3	cldopn	$⊢ D \in Clsd (J) \to ⋃ J ∖ D \in J$
5	2 4	syl	$⊢ (J \in Nrm \land (C \in Clsd (J) \land D \in Clsd (J) \land C \cap D = \emptyset)) \to ⋃ J ∖ D \in J$
6		simpr1	$⊢ (J \in Nrm \land (C \in Clsd (J) \land D \in Clsd (J) \land C \cap D = \emptyset)) \to C \in Clsd (J)$
7		simpr3	$⊢ (J \in Nrm \land (C \in Clsd (J) \land D \in Clsd (J) \land C \cap D = \emptyset)) \to C \cap D = \emptyset$
8	3	cldss	$⊢ C \in Clsd (J) \to C \subseteq ⋃ J$
9		reldisj	$⊢ C \subseteq ⋃ J \to (C \cap D = \emptyset \leftrightarrow C \subseteq ⋃ J ∖ D)$
10	6 8 9	3syl	$⊢ (J \in Nrm \land (C \in Clsd (J) \land D \in Clsd (J) \land C \cap D = \emptyset)) \to (C \cap D = \emptyset \leftrightarrow C \subseteq ⋃ J ∖ D)$
11	7 10	mpbid	$⊢ (J \in Nrm \land (C \in Clsd (J) \land D \in Clsd (J) \land C \cap D = \emptyset)) \to C \subseteq ⋃ J ∖ D$
12		nrmsep3	$⊢ (J \in Nrm \land (⋃ J ∖ D \in J \land C \in Clsd (J) \land C \subseteq ⋃ J ∖ D)) \to \exists x \in J (C \subseteq x \land cls (J) (x) \subseteq ⋃ J ∖ D)$
13	1 5 6 11 12	syl13anc	$⊢ (J \in Nrm \land (C \in Clsd (J) \land D \in Clsd (J) \land C \cap D = \emptyset)) \to \exists x \in J (C \subseteq x \land cls (J) (x) \subseteq ⋃ J ∖ D)$
14		ssdifin0	$⊢ cls (J) (x) \subseteq ⋃ J ∖ D \to cls (J) (x) \cap D = \emptyset$
15	14	anim2i	$⊢ (C \subseteq x \land cls (J) (x) \subseteq ⋃ J ∖ D) \to (C \subseteq x \land cls (J) (x) \cap D = \emptyset)$
16	15	reximi	$⊢ \exists x \in J (C \subseteq x \land cls (J) (x) \subseteq ⋃ J ∖ D) \to \exists x \in J (C \subseteq x \land cls (J) (x) \cap D = \emptyset)$
17	13 16	syl	$⊢ (J \in Nrm \land (C \in Clsd (J) \land D \in Clsd (J) \land C \cap D = \emptyset)) \to \exists x \in J (C \subseteq x \land cls (J) (x) \cap D = \emptyset)$