Dominated convergence theorem involving small Riemann sums (Q2501035)
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: Dominated convergence theorem involving small Riemann sums |
scientific article
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Dominated convergence theorem involving small Riemann sums |
scientific article |
Statements
Dominated convergence theorem involving small Riemann sums (English)
0 references
4 September 2006
0 references
The authors study Henstock integrals for functions defined on a cell \(E\) in \( \mathbb R^n.\) The function \(f\) is Henstock integrable on \(E\) if \(\exists \, A\in\mathbb R : \,\forall\varepsilon > 0\) there is a positive function \(\delta\) on \(E\) such that for every \(\delta\)-fine partition \(D=\{ ( I ,{\mathbf x} ) = \{(I_1,x_1),\dots ,(I_p,x_p)\}\}\) of \(E\) it is \(| \sum_{r=1}^p f(x_r) | I_r| - A | < \varepsilon\), where \(D=\{ ( I ,{\mathbf x} ) = \{(I_1,x_1),\dots ,(I_p,x_p)\}\}\) is a \(\delta\)-fine partition on \(E\) if \(\bigcup_{r=1}^p I_r = E \) (\( I_r \) are non overlapping cells), \(x_r\in I_r\subseteq B (x_r , \delta (x_r))=\{ y :\| x_r - y \| _{\infty} < \delta (x_r)\}.\) It is \(A=(H)\int_{E}f.\) The properties presented in this paper are based on two interval functions defined as follows \(U_{\delta}(I) = \sup \{ f({\mathbf x}) | I | ,( I ,{\mathbf x} )\text{ is }\delta\)-fine
0 references
Henstock integrals
0 references
