This is an announcement for the paper "Improving integrability via absolute summability: a general version of Diestel's Theorem" by Daniel Pellegrino, Pilar Rueda and Enrique Sanchez-Perez.

Abstract: A classical result by J. Diestel establishes that the composition of a summing operator with a (strongly measurable) Pettis integrable function gives a Bochner integrable function. In this paper we show that a much more general result is possible regarding the improvement of the integrability of vector valued functions by the summability of the operator. After proving a general result, we center our attention in the particular case given by the $(p,\sigma)$-absolutely continuous operators, that allows to prove a lot of special results on integration improvement for selected cases of classical Banach spaces ---including $C(K)$, $L^p$ and Hilbert spaces--- and operators ---$p$-summing, $(q,p)$-summing and $p$-approximable operators---.

Archive classification: math.FA

Submitted from: pellegrino@pq.cnpq.br

The paper may be downloaded from the archive by web browser from URL

http://front.math.ucdavis.edu/1502.01970

or

http://arXiv.org/abs/1502.01970