distop

Description: The discrete topology on a set A . Part of Example 2 in Munkres p. 77. (Contributed by FL, 17-Jul-2006) (Revised by Mario Carneiro, 19-Mar-2015)

		Ref	Expression
	Assertion	distop	$⊢ A \in V \to 𝒫 A \in Top$

Proof

Step	Hyp	Ref	Expression
1		uniss	$⊢ x \subseteq 𝒫 A \to ⋃ x \subseteq ⋃ 𝒫 A$
2		unipw	$⊢ ⋃ 𝒫 A = A$
3	1 2	sseqtrdi	$⊢ x \subseteq 𝒫 A \to ⋃ x \subseteq A$
4		vuniex	$⊢ ⋃ x \in V$
5	4	elpw	$⊢ ⋃ x \in 𝒫 A \leftrightarrow ⋃ x \subseteq A$
6	3 5	sylibr	$⊢ x \subseteq 𝒫 A \to ⋃ x \in 𝒫 A$
7	6	ax-gen	$⊢ \forall x (x \subseteq 𝒫 A \to ⋃ x \in 𝒫 A)$
8	7	a1i	$⊢ A \in V \to \forall x (x \subseteq 𝒫 A \to ⋃ x \in 𝒫 A)$
9		velpw	$⊢ x \in 𝒫 A \leftrightarrow x \subseteq A$
10		velpw	$⊢ y \in 𝒫 A \leftrightarrow y \subseteq A$
11		ssinss1	$⊢ x \subseteq A \to x \cap y \subseteq A$
12	11	a1i	$⊢ y \subseteq A \to (x \subseteq A \to x \cap y \subseteq A)$
13		vex	$⊢ y \in V$
14	13	inex2	$⊢ x \cap y \in V$
15	14	elpw	$⊢ x \cap y \in 𝒫 A \leftrightarrow x \cap y \subseteq A$
16	12 15	syl6ibr	$⊢ y \subseteq A \to (x \subseteq A \to x \cap y \in 𝒫 A)$
17	10 16	sylbi	$⊢ y \in 𝒫 A \to (x \subseteq A \to x \cap y \in 𝒫 A)$
18	17	com12	$⊢ x \subseteq A \to (y \in 𝒫 A \to x \cap y \in 𝒫 A)$
19	9 18	sylbi	$⊢ x \in 𝒫 A \to (y \in 𝒫 A \to x \cap y \in 𝒫 A)$
20	19	ralrimiv	$⊢ x \in 𝒫 A \to \forall y \in 𝒫 A x \cap y \in 𝒫 A$
21	20	rgen	$⊢ \forall x \in 𝒫 A \forall y \in 𝒫 A x \cap y \in 𝒫 A$
22	21	a1i	$⊢ A \in V \to \forall x \in 𝒫 A \forall y \in 𝒫 A x \cap y \in 𝒫 A$
23		pwexg	$⊢ A \in V \to 𝒫 A \in V$
24		istopg	$⊢ 𝒫 A \in V \to (𝒫 A \in Top \leftrightarrow (\forall x (x \subseteq 𝒫 A \to ⋃ x \in 𝒫 A) \land \forall x \in 𝒫 A \forall y \in 𝒫 A x \cap y \in 𝒫 A))$
25	23 24	syl	$⊢ A \in V \to (𝒫 A \in Top \leftrightarrow (\forall x (x \subseteq 𝒫 A \to ⋃ x \in 𝒫 A) \land \forall x \in 𝒫 A \forall y \in 𝒫 A x \cap y \in 𝒫 A))$
26	8 22 25	mpbir2and	$⊢ A \in V \to 𝒫 A \in Top$

Metamath Proof Explorer

Theorem distop

Proof