Some inclusion results for interpolated summing operator ideals and integrability improvement of vector valued functions

Abstract

Consider a Banach space valued measurable function f and an operator u from the space where f takes values. If f is Pettis integrable, a classical result due to J. Diestel shows that composing it with u gives a Bochner integrable function u f whenever u is absolutely summing. In a previous work we have shown that a well-known interpolation technique for operator ideals allows to prove under some requirements that a composition of a p-Pettis integrable function with a q-summing operator provides an r-Bochner integrable function. In this paper a new abstract inclusion theorem for classes of abstract summing operators is shown and applied to the class of interpolated operator ideals. Together with the results of the aforementioned paper, it provides more results on the relation about the integrability of the function u f and the summability properties of u.