Another proof of the measurability of \(\delta\) for the generalized Riemann integral (Q584434)
From MaRDI portal
 | This is the item page for this Wikibase entity, intended for internal use and editing purposes. Please use this page instead for the normal view: Another proof of the measurability of \(\delta\) for the generalized Riemann integral |
scientific article; zbMATH DE number 4134361
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Another proof of the measurability of \(\delta\) for the generalized Riemann integral |
scientific article; zbMATH DE number 4134361 |
Statements
Another proof of the measurability of \(\delta\) for the generalized Riemann integral (English)
0 references
1990
0 references
The author proves that restricting the function \(\delta\) in the generalized Riemann integral to be measurable does not change the nature of the integral. The proof consists in first noting that the integral defined using a measurable \(\delta\) has the same basic properties as the apparently more general integral, then the result follows using Romanovskii's lemma. A similar proof of a more complicated but more general result (\(\delta\) is upper-semi continuous on a set of full measure) has been given by \textit{W. F. Pfeffer} [Proc. Am. Math. Soc. 103, No.4, 1161-1166 (1988; Zbl 0656.26010)].
0 references
function \(\delta \)
0 references
generalized Riemann integral
0 references
Romanovskii's lemma
0 references
