Caratheodory's Theorem

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Statement

Consider an out measure on . Define

.

Then is a -algebra and is a measure on .

Proof

First, observe that is closed under complements due to symmetry in the meaning of -measurability. Now, we show if then .

Suppose . Then

and by subadditivity

But certainly, since the inequality in the other direction also holds, and we conclude

hence and we have is an algebra.


Now, suppose and are disjoint. Then

so is finitely additive.


Next, we show is closed under countable disjoint unions. Given a disjoint sequence of sets , for all , by countable subadditivity,