df-cmp

Description: Definition of a compact topology. A topology is compact iff any open covering of its underlying set contains a finite subcovering (Heine-Borel property). Definition C''' of BourbakiTop1 p. I.59. Note: Bourbaki uses the term "quasi-compact" (saving "compact" for "compact Hausdorff"), but it is not the modern usage (which we follow). (Contributed by FL, 22-Dec-2008)

		Ref	Expression
	Assertion	df-cmp	$⊢ Comp = \{x \in Top \| \forall y \in 𝒫 x (⋃ x = ⋃ y \to \exists z \in (𝒫 y \cap Fin) ⋃ x = ⋃ z)\}$

Detailed syntax breakdown

Step	Hyp	Ref	Expression
0		ccmp	$class Comp$
1		vx	$setvar x$
2		ctop	$class Top$
3		vy	$setvar y$
4	1	cv	$setvar x$
5	4	cpw	$class 𝒫 x$
6	4	cuni	$class ⋃ x$
7	3	cv	$setvar y$
8	7	cuni	$class ⋃ y$
9	6 8	wceq	$wff ⋃ x = ⋃ y$
10		vz	$setvar z$
11	7	cpw	$class 𝒫 y$
12		cfn	$class Fin$
13	11 12	cin	$class (𝒫 y \cap Fin)$
14	10	cv	$setvar z$
15	14	cuni	$class ⋃ z$
16	6 15	wceq	$wff ⋃ x = ⋃ z$
17	16 10 13	wrex	$wff \exists z \in (𝒫 y \cap Fin) ⋃ x = ⋃ z$
18	9 17	wi	$wff (⋃ x = ⋃ y \to \exists z \in (𝒫 y \cap Fin) ⋃ x = ⋃ z)$
19	18 3 5	wral	$wff \forall y \in 𝒫 x (⋃ x = ⋃ y \to \exists z \in (𝒫 y \cap Fin) ⋃ x = ⋃ z)$
20	19 1 2	crab	$class \{x \in Top \| \forall y \in 𝒫 x (⋃ x = ⋃ y \to \exists z \in (𝒫 y \cap Fin) ⋃ x = ⋃ z)\}$
21	0 20	wceq	$wff Comp = \{x \in Top \| \forall y \in 𝒫 x (⋃ x = ⋃ y \to \exists z \in (𝒫 y \cap Fin) ⋃ x = ⋃ z)\}$

Metamath Proof Explorer

Definition df-cmp

Detailed syntax breakdown