riinopn

Description: A finite indexed relative intersection of open sets is open. (Contributed by Mario Carneiro, 22-Aug-2015)

		Ref	Expression
	Hypothesis	1open.1	$⊢ X = ⋃ J$
	Assertion	riinopn	$⊢ (J \in Top \land A \in Fin \land \forall x \in A B \in J) \to X \cap ⋂_{x \in A} B \in J$

Proof

Step	Hyp	Ref	Expression
1		1open.1	$⊢ X = ⋃ J$
2		riin0	$⊢ A = \emptyset \to X \cap ⋂_{x \in A} B = X$
3	2	adantl	$⊢ ((J \in Top \land A \in Fin \land \forall x \in A B \in J) \land A = \emptyset) \to X \cap ⋂_{x \in A} B = X$
4		simpl1	$⊢ ((J \in Top \land A \in Fin \land \forall x \in A B \in J) \land A = \emptyset) \to J \in Top$
5	1	topopn	$⊢ J \in Top \to X \in J$
6	4 5	syl	$⊢ ((J \in Top \land A \in Fin \land \forall x \in A B \in J) \land A = \emptyset) \to X \in J$
7	3 6	eqeltrd	$⊢ ((J \in Top \land A \in Fin \land \forall x \in A B \in J) \land A = \emptyset) \to X \cap ⋂_{x \in A} B \in J$
8	1	eltopss	$⊢ (J \in Top \land B \in J) \to B \subseteq X$
9	8	ex	$⊢ J \in Top \to (B \in J \to B \subseteq X)$
10	9	adantr	$⊢ (J \in Top \land A \in Fin) \to (B \in J \to B \subseteq X)$
11	10	ralimdv	$⊢ (J \in Top \land A \in Fin) \to (\forall x \in A B \in J \to \forall x \in A B \subseteq X)$
12	11	3impia	$⊢ (J \in Top \land A \in Fin \land \forall x \in A B \in J) \to \forall x \in A B \subseteq X$
13		riinn0	$⊢ (\forall x \in A B \subseteq X \land A \neq \emptyset) \to X \cap ⋂_{x \in A} B = ⋂_{x \in A} B$
14	12 13	sylan	$⊢ ((J \in Top \land A \in Fin \land \forall x \in A B \in J) \land A \neq \emptyset) \to X \cap ⋂_{x \in A} B = ⋂_{x \in A} B$
15		iinopn	$⊢ (J \in Top \land (A \in Fin \land A \neq \emptyset \land \forall x \in A B \in J)) \to ⋂_{x \in A} B \in J$
16	15	3exp2	$⊢ J \in Top \to (A \in Fin \to (A \neq \emptyset \to (\forall x \in A B \in J \to ⋂_{x \in A} B \in J)))$
17	16	com34	$⊢ J \in Top \to (A \in Fin \to (\forall x \in A B \in J \to (A \neq \emptyset \to ⋂_{x \in A} B \in J)))$
18	17	3imp1	$⊢ ((J \in Top \land A \in Fin \land \forall x \in A B \in J) \land A \neq \emptyset) \to ⋂_{x \in A} B \in J$
19	14 18	eqeltrd	$⊢ ((J \in Top \land A \in Fin \land \forall x \in A B \in J) \land A \neq \emptyset) \to X \cap ⋂_{x \in A} B \in J$
20	7 19	pm2.61dane	$⊢ (J \in Top \land A \in Fin \land \forall x \in A B \in J) \to X \cap ⋂_{x \in A} B \in J$

Metamath Proof Explorer

Theorem riinopn

Proof