Lefschetz zeta function: Difference between revisions

Revision as of 02:50, 30 April 2013

In mathematics, a measure is said to be saturated if every locally measurable set is also measurable.^[1] A set $E$ , not necessarily measurable, is said to be locally measurable if for every measurable set $A$ of finite measure, $E\cap A$ is measurable. $\sigma$ -finite measures, and measures arising as the restriction of outer measures, are saturated.

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↑ Bogachev, Vladmir (2007). Measure Theory Volume 2. Springer. ISBN 978-3-540-34513-8.

[1] Bogachev, Vladmir (2007). Measure Theory Volume 2. Springer. ISBN 978-3-540-34513-8.

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+In [[mathematics]], a [[Measure (mathematics)|measure]] is said to be '''saturated''' if every locally measurable set is also [[measurable]].<ref>Bogachev, Vladmir (2007). ''Measure Theory Volume 2''. Springer. ISBN 978-3-540-34513-8.</ref>  A set <math>E</math>, not necessarily measurable, is said to be '''locally measurable''' if for every measurable set <math>A</math> of finite measure, <math>E \cap A</math> is measurable.  <math>\sigma</math>-finite measures, and measures arising as the restriction of [[outer measure]]s, are saturated.
+==References==
+{{reflist}}
+[[Category:Measures (measure theory)]]
+{{mathanalysis-stub}}

Lefschetz zeta function: Difference between revisions

Revision as of 02:50, 30 April 2013

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