Non virtually solvable subgroups of mapping class groups have non virtually solvable representations
Geometric Topology
2018-05-07 v1 Group Theory
Abstract
Let be a compact orientable surface of finite type with at least one boundary component. Let be a non virtually solvable subgroup. We answer a question of Lubotzky by showing that there exists a finite dimensional homological representation of such that is not virtually solvable. We then apply results of Lubotzky and Meiri to show that for any random walk on such a group the probability of landing on a power, or on an element with topological entropy both decrease exponentially in the length of the walk.
Cite
@article{arxiv.1805.01527,
title = {Non virtually solvable subgroups of mapping class groups have non virtually solvable representations},
author = {Asaf Hadari},
journal= {arXiv preprint arXiv:1805.01527},
year = {2018}
}
Comments
17 pages