Group invariant separating polynomials on a Banach space
Abstract
We study the group invariant continuous polynomials on a Banach space that separate a given set in and a point outside . We show that if is a real Banach space, is a compact group of , is a -invariant set in , and is a point outside that can be separated from by a continuous polynomial , then can also be separated from by a -invariant continuous polynomial . It turns out that this result does not hold when is a complex Banach space, so we present some additional conditions to get analogous results for the complex case. We also obtain separation theorems under the assumption that has a Schauder basis which give applications to several classical groups. In this case, we obtain characterizations of points which can be separated by a group invariant polynomial from the closed unit ball.
Keywords
Cite
@article{arxiv.2004.11631,
title = {Group invariant separating polynomials on a Banach space},
author = {Javier Falco and Domingo Garcia and Mingu Jung and Manuel Maestre},
journal= {arXiv preprint arXiv:2004.11631},
year = {2020}
}
Comments
17 pages