Subgroups arising from connected components in the Morse boundary
Group Theory
2024-03-07 v1
Abstract
We study connected components of the Morse boundary and their stabilisers. We introduce the notion of point-convergence and show that if the set of non-singleton connected components of the Morse boundary of a finitely generated group is point-convergent, then every non-singleton connected component is the (relative) Morse boundary of its stabiliser. The above property only depends on the topology of the Morse boundary and hence is invariant under quasi-isometry. This shows that the topology of the Morse boundary not only carries algebraic information but can be used to detect certain subgroups which in some sense are invariant under quasi-isometry.
Cite
@article{arxiv.2403.03939,
title = {Subgroups arising from connected components in the Morse boundary},
author = {Annette Karrer and Babak Miraftab and Stefanie Zbinden},
journal= {arXiv preprint arXiv:2403.03939},
year = {2024}
}
Comments
18 pages, 5 figures, comments welcome!