English

Continuous version of the Choquet Integral Reperesentation Theorem

Functional Analysis 2007-05-23 v2

Abstract

The Choquet - Bishop - de Leeuw theorem states that each element of a compact convex subset of a locally convex topological Hausdorff space is a barycenter of a probability measure supported by the set of extreme points of that set. By the Edgar - Mankiewicz result this remains true for nonempty closed bounded and convex set provided it has Radon - Nikodym property. In the paper it is shown, that Choquet - type theorem holds also for "moving" sets: they are values of a certain multifunction. Namely, the existence of a suitable weak* continuous family of probability measures "almost representing" points of such sets is proven. Both compact and noncompact cases are considered. The continuous versions of the Krein - Milman theorem are obtained as corollaries.

Keywords

Cite

@article{arxiv.math/0405217,
  title  = {Continuous version of the Choquet Integral Reperesentation Theorem},
  author = {Piotr Puchała},
  journal= {arXiv preprint arXiv:math/0405217},
  year   = {2007}
}

Comments

9 pages, minor historical, editorial and bibliographical changes; version as appeared in the journal