Difference between revisions of "Radon-Nikodým theorem"

A charge that is absolutely continuous with respect to some measure has a density with respect to that is summable with respect to this measure. It was established by J. Radon [1] and O.M. Nikodým [2]. More precisely, on a measurable space , where is a -algebra of subsets of , suppose one is given a charge , i.e. a countably-additive real or complex function given on , and a -finite measure , and, moreover, let be absolutely continuous with respect to . Then there is a function , , summable with respect to , such that for any set ,

The function is unique (except for modifications on a set of -measure zero), and is called the density of the charge with respect to the measure . There are (see [4]) generalizations of the theorem to the case when the charge takes values in some vector space.

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Comments

The notion of "charge" is not well established in the West; one usually says "signed measure" (cf. Charge). The density is also well defined if is the sum of a series of (non-negative) measures; in this case and the integral may take the value .

The theorem is false if fails to satisfy same finiteness condition; see [a1], §19, for a thorough discussion and illuminating examples.

For the generalizations of the theorem to vector measures (and relations to the geometry of Banach spaces) see Vector measure.

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