Analytic measures and Bochner measurability
Functional Analysis
2008-02-03 v2
Abstract
Let be a -algebra over , and let denote the Banach space of complex measures. Consider a representation for acting on . We show that under certain, very weak hypotheses, that if for a given and all the map is in , then it follows that the map is Bochner measurable. The proof is based upon the idea of the Analytic Radon Nikod\'ym Property. Straightforward applications yield a new and simpler proof of Forelli's main result concerning analytic measures ({\it Analytic and quasi-invariant measures}, Acta Math., {\bf 118} (1967), 33--59).
Cite
@article{arxiv.math/9501211,
title = {Analytic measures and Bochner measurability},
author = {N. Asmar and Stephen J. Montgomery-Smith},
journal= {arXiv preprint arXiv:math/9501211},
year = {2008}
}