Covering theorems and Lebesgue integration
Abstract
This paper shows how the Lebesgue integral can be obtained as a Riemann sum and provides an extension of the Morse Covering Theorem to open sets. Let be a finite dimensional normed space; let be a Radon measure on and let be a -measurable set. For , a -measurable set is a -Morse set with tag if there is such that and is starlike with respect to all points in the closed ball . Given a gauge we say is -fine if . If is a -measurable function on then if and only if for some and all there is a gauge function so that for all sequences of disjoint -Morse sets that are -fine and cover all but a -null subset of . This procedure can be applied separately to the positive and negative parts of a real-valued function on . The covering condition can be satisfied due to the Morse Covering Theorem. The improved version given here says that for a fixed , if is the set of centers of a family of -Morse sets then can be covered with the interiors of sets from at most pairwise disjoint subfamilies of the original family; an estimate for is given in terms of , and its norm.
Cite
@article{arxiv.math/0101014,
title = {Covering theorems and Lebesgue integration},
author = {Peter A. Loeb and Erik Talvila},
journal= {arXiv preprint arXiv:math/0101014},
year = {2007}
}
Comments
To appear in Mathematica Japonica, 13 pages