iuncld

Description: A finite indexed union of closed sets is closed. (Contributed by Mario Carneiro, 19-Sep-2015)

		Ref	Expression
	Hypothesis	clscld.1	$⊢ X = ⋃ J$
	Assertion	iuncld	$⊢ (J \in Top \land A \in Fin \land \forall x \in A B \in Clsd (J)) \to ⋃_{x \in A} B \in Clsd (J)$

Proof

Step	Hyp	Ref	Expression
1		clscld.1	$⊢ X = ⋃ J$
2		difin	$⊢ X ∖ (X \cap ⋂_{x \in A} (X ∖ B)) = X ∖ ⋂_{x \in A} (X ∖ B)$
3		iundif2	$⊢ ⋃_{x \in A} (X ∖ (X ∖ B)) = X ∖ ⋂_{x \in A} (X ∖ B)$
4	2 3	eqtr4i	$⊢ X ∖ (X \cap ⋂_{x \in A} (X ∖ B)) = ⋃_{x \in A} (X ∖ (X ∖ B))$
5	1	cldss	$⊢ B \in Clsd (J) \to B \subseteq X$
6		dfss4	$⊢ B \subseteq X \leftrightarrow X ∖ (X ∖ B) = B$
7	5 6	sylib	$⊢ B \in Clsd (J) \to X ∖ (X ∖ B) = B$
8	7	ralimi	$⊢ \forall x \in A B \in Clsd (J) \to \forall x \in A X ∖ (X ∖ B) = B$
9	8	3ad2ant3	$⊢ (J \in Top \land A \in Fin \land \forall x \in A B \in Clsd (J)) \to \forall x \in A X ∖ (X ∖ B) = B$
10		iuneq2	$⊢ \forall x \in A X ∖ (X ∖ B) = B \to ⋃_{x \in A} (X ∖ (X ∖ B)) = ⋃_{x \in A} B$
11	9 10	syl	$⊢ (J \in Top \land A \in Fin \land \forall x \in A B \in Clsd (J)) \to ⋃_{x \in A} (X ∖ (X ∖ B)) = ⋃_{x \in A} B$
12	4 11	syl5eq	$⊢ (J \in Top \land A \in Fin \land \forall x \in A B \in Clsd (J)) \to X ∖ (X \cap ⋂_{x \in A} (X ∖ B)) = ⋃_{x \in A} B$
13		simp1	$⊢ (J \in Top \land A \in Fin \land \forall x \in A B \in Clsd (J)) \to J \in Top$
14	1	cldopn	$⊢ B \in Clsd (J) \to X ∖ B \in J$
15	14	ralimi	$⊢ \forall x \in A B \in Clsd (J) \to \forall x \in A X ∖ B \in J$
16	1	riinopn	$⊢ (J \in Top \land A \in Fin \land \forall x \in A X ∖ B \in J) \to X \cap ⋂_{x \in A} (X ∖ B) \in J$
17	15 16	syl3an3	$⊢ (J \in Top \land A \in Fin \land \forall x \in A B \in Clsd (J)) \to X \cap ⋂_{x \in A} (X ∖ B) \in J$
18	1	opncld	$⊢ (J \in Top \land X \cap ⋂_{x \in A} (X ∖ B) \in J) \to X ∖ (X \cap ⋂_{x \in A} (X ∖ B)) \in Clsd (J)$
19	13 17 18	syl2anc	$⊢ (J \in Top \land A \in Fin \land \forall x \in A B \in Clsd (J)) \to X ∖ (X \cap ⋂_{x \in A} (X ∖ B)) \in Clsd (J)$
20	12 19	eqeltrrd	$⊢ (J \in Top \land A \in Fin \land \forall x \in A B \in Clsd (J)) \to ⋃_{x \in A} B \in Clsd (J)$

Metamath Proof Explorer

Theorem iuncld

Proof