Category:Concentration of Signed Measure on Measurable Set
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This category contains results about Concentration of Signed Measure on Measurable Set.
Definitions specific to this category can be found in Definitions/Concentration of Signed Measure on Measurable Set.
Let $\mu$ be a signed measure on $\struct {X, \Sigma}$.
Let $\size \mu$ be the variation of $\mu$.
Let $E \in \Sigma$.
We say that $\mu$ is concentrated on $E$ if and only if:
- $\map {\size \mu} {E^c} = 0$
Pages in category "Concentration of Signed Measure on Measurable Set"
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