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Questions about abstract measure and Lebesgue integral theory. Also concerns such properties as measurability of maps and sets.

6 votes

Which sigma-ideals in a sigma-algebra are ideals of null sets?

Your question has already been excellently answered from two points of view: (a) looking at the quotient $\sigma$-algebra (measurable sets modulo null sets): when is it a measure algebra? [Joseph Va …
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2 votes

Tightness of Measures, Riesz Representation for locally compact spaces

A (specific and historical) complement to barcelos answer, too long to be correctly formatted as comment: From Bourbaki's historical notes to chaper IX of integration: A. D. Alexandroff [...] introdu …
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3 votes
Accepted

Non-Polish Lebesgue probability space?

When requesting inner regularity, you hit the ZFC - undecidable Cantor's continuum problem. First note that a Lebesgue space has cardinality at most continuum since a countable collection of subsets …
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5 votes
Accepted

Is the "continuous on compact subsets" characterization of measurable functions actually use...

Tautological answer: the cases where you know the measure of compact sets (as in section 3 of chapter IX of Bourbaki), but not the class of all measurable sets (which you then can define using the abo …
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4 votes

Riesz's representation theorem for non-locally compact spaces

Historical notes of chapter 9 of Bourbaki's integration give the following as original reference for the case of completely regular spaces: A. D. Alexandroff, Additive set functions in abstract space …
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1 vote

Integration on Compact Semirings

An easy answer along traditional lines is available iff the measure has "bounded variation" in a suitable sense. To undestand this, first note that integration with values in Banach algebras (which …
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