Lebesgue-Stieljes Measures: Difference between revisions

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Given <math> F : R \rightarrow R </math> nondecreasing and right contiuous, define an outer measure by
Given <math> F : R \rightarrow R </math> nondecreasing and right contiuous, define an outer measure by


:<math>\mu_F^{*}(A) = \inf\left\{\sum_i \mu_F^{*}(\left(a, b\right]) \ : \  A\subset \bigcup_i \left(a, b\right] \right\}</math>
:<math>\mu_F^{*}(A) = \inf\left\{\sum_i \mu_F^{*}(\left(a, b\right]) \ : \  A\subset \bigcup_i \left(a, b\right] \right\}</math>

Revision as of 06:35, 19 December 2020

Given nondecreasing and right contiuous, define an outer measure by

where and the infimum taken over all coverings of A by countably many semiopen intervals. By Carathéodory's Theorem, we know that is a measure. This measure is sometimes called the Lebesgue–Stieltjes measure associated with F.[1]

References

  1. Folland, Gerald B. (1999). Real Analysis: Modern Techniques and Their Applications, John Wiley and Sons, ISBN 0471317160, Second edition.