Original Articles

EMBEDDING C₀ IN THE SPACE OF PETTIS INTEGRABLE FUNCTIONS

Published in: Quaestiones Mathematicae
Volume 21 , issue 3-4 , 1998 , pages: 261–267

DOI: 10.1080/16073606.1998.9632045

Author(s): FranciscoJ. Freniche Departamento de Análisis Matemático,

Keywords: 28B05 , 46G10 , 28B05 , 46G10

Abstract

We show that the normed space of μ-measurable Pettis integrable functions on a probability space with values in a Banach space X contains a copy of the sequence space c₀ if and only if X contains a copy of c₀. In this case, if the probability μ has infinite range, a copy of c₀ consisting of μ-measurable functions can be found, such that it is complemented in the bigger space of all weakly μ-measurable Pettis integrable functions.

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