arXiv:1902.05154 Abstract | arXiv Analytics

arXiv:1902.05154 [math.FA]Abstract References Reviews Resources

$L^1$-spaces of vector measures with vector density

Published 2019-02-13Version 1

Let $F$ be a function with values in a Banach space. When $F$ is locally (Pettis or Bochner) integrable with respect to a locally determined positive measure, a vector measure $\nu_F$ with density $F$ defined on a $\delta$-ring is obtained. We present the existing connection between the spaces $L^1_w(\nu_F)$, $L^1(\nu_F)$ and $L^1(|\nu_F|)$ and the spaces of Dunford, Pettis or Bochner integrable functions.

Comments: 15 pages

Categories: math.FA

Subjects: 46G10, 28B05

Keywords: vector measure, vector density, banach space, bochner integrable functions, locally determined positive measure

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