Equivariance in Approximation by Compact Sets
Abstract
We adapt a construction of Gabrielov and Vorobjov for use in the symmetric case. Gabrielov and Vorobjov had developed a means by which one may replace an arbitrary set definable in some o-minimal expansion of with a compact set . is constructed in such a way that for a given we have epimorphisms from the first homotopy and homology groups of to those of . If is defined by a boolean combination of statements and for various in some finite collection of definable continuous functions, one may choose so that these maps are isomorphisms for . In this case, is also defined by functions closely related to those defining . In this paper we study sets symmetric under the action of some finite reflection group . One may see that in the original construction, if is defined by functions symmetric relative to the action of , then will be as well. We show that there is an equivariant map inducing the aforementioned epimorphisms and isomorphisms of homotopy and homology groups. We use this result to strengthen theorems of Basu and Riener concerning the multiplicities of Specht modules in the isotypic decomposition of the cohomology spaces of sets defined by polynomials symmetric relative to .
Cite
@article{arxiv.2312.16647,
title = {Equivariance in Approximation by Compact Sets},
author = {Saugata Basu and Alison Rosenblum},
journal= {arXiv preprint arXiv:2312.16647},
year = {2023}
}
Comments
56 pages, 3 figures