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changed to more precise title

edited Aug 9, 2019 at 13:13

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Is every closed subset of finite measure contained in an open subset of finite measure?

Could someone will verify my statement: For every locally finite Borel measure on metric space and closed set $F$ with finite measure, there exists open set $U$ such that $F \subset U$ and $U$ has finite measure ?

asked Aug 8, 2019 at 23:50

Michael