Riemann integrability versus weak continuity
Functional Analysis
2015-10-30 v1
Abstract
In this paper we focus on the relation between Riemann integrability and weak continuity. A Banach space is said to have the weak Lebesgue property if every Riemann integrable function from into is weakly continuous almost everywhere. We prove that the weak Lebesgue property is stable under -sums and obtain new examples of Banach spaces with and without this property. Furthermore, we characterize Dunford-Pettis operators in terms of Riemann integrability and provide a quantitative result about the size of the set of -continuous non Riemann integrable functions, with a locally convex topology weaker than the norm topology.
Cite
@article{arxiv.1510.08801,
title = {Riemann integrability versus weak continuity},
author = {Gonzalo Martínez-Cervantes},
journal= {arXiv preprint arXiv:1510.08801},
year = {2015}
}