Metamath Proof Explorer

Theorem caragenss

Description: The sigma-algebra generated from an outer measure, by the Caratheodory's construction, is a subset of the domain of the outer measure. (Contributed by Glauco Siliprandi, 17-Aug-2020)

		Ref	Expression
	Hypothesis	caragenss.1	$⊢ S = CaraGen (O)$
	Assertion	caragenss	$⊢ O \in OutMeas \to S \subseteq dom O$

Proof

Step	Hyp	Ref	Expression
1		caragenss.1	$⊢ S = CaraGen (O)$
2		ssrab2	$⊢ \{e \in 𝒫 ⋃ dom O \| \forall a \in 𝒫 ⋃ dom O O (a \cap e) +_{𝑒} O (a ∖ e) = O (a)\} \subseteq 𝒫 ⋃ dom O$
3	2	a1i	$⊢ O \in OutMeas \to \{e \in 𝒫 ⋃ dom O \| \forall a \in 𝒫 ⋃ dom O O (a \cap e) +_{𝑒} O (a ∖ e) = O (a)\} \subseteq 𝒫 ⋃ dom O$
4	1	a1i	$⊢ O \in OutMeas \to S = CaraGen (O)$
5		caragenval	$⊢ O \in OutMeas \to CaraGen (O) = \{e \in 𝒫 ⋃ dom O \| \forall a \in 𝒫 ⋃ dom O O (a \cap e) +_{𝑒} O (a ∖ e) = O (a)\}$
6	4 5	eqtrd	$⊢ O \in OutMeas \to S = \{e \in 𝒫 ⋃ dom O \| \forall a \in 𝒫 ⋃ dom O O (a \cap e) +_{𝑒} O (a ∖ e) = O (a)\}$
7		omedm	$⊢ O \in OutMeas \to dom O = 𝒫 ⋃ dom O$
8	6 7	sseq12d	$⊢ O \in OutMeas \to (S \subseteq dom O \leftrightarrow \{e \in 𝒫 ⋃ dom O \| \forall a \in 𝒫 ⋃ dom O O (a \cap e) +_{𝑒} O (a ∖ e) = O (a)\} \subseteq 𝒫 ⋃ dom O)$
9	3 8	mpbird	$⊢ O \in OutMeas \to S \subseteq dom O$