English

Covering theorems and Lebesgue integration

Classical Analysis and ODEs 2007-05-23 v1

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 XX be a finite dimensional normed space; let μ\mu be a Radon measure on XX and let ΩX\Omega\subseteq X be a μ\mu-measurable set. For λ1\lambda\geq1, a μ\mu -measurable set Sλ(a)XS_{\lambda}(a)\subseteq X is a λ\lambda-Morse set with tag aSλ(a)a\in S_{\lambda}(a) if there is r>0r>0 such that B(a,r)Sλ(a)B(a,λr)B(a,r)\subseteq S_{\lambda }(a)\subseteq B(a,\lambda r) and Sλ(a)S_{\lambda}(a) is starlike with respect to all points in the closed ball B(a,r)B(a,r). Given a gauge δ:Ω(0,1]\delta:\Omega \to(0,1] we say Sλ(a)S_{\lambda}(a) is δ\delta-fine if B(a,λr)B(a,δ(a))B(a,\lambda r)\subseteq B(a,\delta(a)). If f0f\geq0 is a μ\mu-measurable function on Ω\Omega then Ωfdμ=FR\int_{\Omega}f d\mu=F\in\mathbb{R} if and only if for some λ1\lambda\geq1 and all ϵ>0\epsilon>0 there is a gauge function δ\delta so that nf(xn)μ(S(xn))F<ϵ|\sum_{n}f(x_{n}) \mu(S(x_{n}))-F|<\epsilon for all sequences of disjoint λ\lambda-Morse sets that are δ\delta-fine and cover all but a μ\mu -null subset of Ω\Omega. This procedure can be applied separately to the positive and negative parts of a real-valued function on Ω\Omega. The covering condition μ(ΩnS(xn))=0\mu(\Omega\setminus\cup_{n}S(x_{n}))=0 can be satisfied due to the Morse Covering Theorem. The improved version given here says that for a fixed λ1\lambda\geq1, if AA is the set of centers of a family of λ\lambda-Morse sets then AA can be covered with the interiors of sets from at most κ\kappa pairwise disjoint subfamilies of the original family; an estimate for κ\kappa is given in terms of λ\lambda, XX and its norm.

Keywords

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