Transformations of Moment Functionals
Abstract
In measure theory several results are known how measure spaces are transformed into each other. But since moment functionals are represented by a measure we investigate in this study the effects and implications of these measure transformations to moment funcationals. We gain characterizations of moments functionals. Among other things we show that for a compact and path connected set there exists a measurable function such that any linear functional is a -moment functional if and only if it has a continuous extension to some such that defined by for all is a -moment functional (Hausdorff moment problem). Additionally, there exists a continuous function independent on such that the representing measure of provides the representing measure of . We also show that every moment functional is represented by for some measurable function where is the Lebesgue on .
Cite
@article{arxiv.2007.13347,
title = {Transformations of Moment Functionals},
author = {Philipp J. di Dio},
journal= {arXiv preprint arXiv:2007.13347},
year = {2020}
}