Topological groups with invariant linear spans
Abstract
Given a topological group that can be embedded as a topological subgroup into some topological vector space (over the field of reals) we say that has invariant linear span if all linear spans of under arbitrary embeddings into topological vector spaces are isomorphic as topological vector spaces. For an arbitrary set let be the direct sum of -many copies of the discrete group of integers endowed with the Tychonoff product topology. We show that the topological group has invariant linear span. This answers a question of D. Dikranjan et al. in positive. We prove that given a non-discrete sequential space , the free abelian topological group over is an example of a topological group that embeds into a topological vector space but does not have invariant linear span.
Keywords
Cite
@article{arxiv.2007.11254,
title = {Topological groups with invariant linear spans},
author = {Eva Pernecká and Jan Spěvák},
journal= {arXiv preprint arXiv:2007.11254},
year = {2020}
}
Comments
5 pages