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Measure in mathematics
In mathematics, a measure is said to be saturated if every locally measurable set is also measurable.[1] A set , not necessarily measurable, is said to be a locally measurable set if for every measurable set
of finite measure,
is measurable.
-finite measures and measures arising as the restriction of outer measures are saturated.
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Basic concepts | |||||
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Sets | |||||
Types of Measures |
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Particular measures | |||||
Maps | |||||
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