English

Fixed subgroups are compressed in surface groups

Group Theory 2015-01-28 v1

Abstract

For a compact surface Σ\Sigma (orientable or not, and with boundary or not) we show that the fixed subgroup, FixB\operatorname{Fix} B, of any family BB of endomorphisms of π1(Σ)\pi_1(\Sigma) is compressed in π1(Σ)\pi_1(\Sigma) i.e., rk((FixB)H)rk(H)\operatorname{rk}((\operatorname{Fix} B)\cap H)\leq \operatorname{rk}(H) for any subgroup FixBHπ1(Σ)\operatorname{Fix} B \leq H \leq \pi_1(\Sigma). On the way, we give a partial positive solution to the inertia conjecture, both for free and for surface groups. We also investigate direct products, GG, of finitely many free and surface groups, and give a characterization of when GG satisfies that rk(Fixϕ)rk(G)\operatorname{rk}(\operatorname{Fix} \phi) \leq \operatorname{rk}(G) for every ϕAut(G)\phi \in Aut(G).

Keywords

Cite

@article{arxiv.1501.06723,
  title  = {Fixed subgroups are compressed in surface groups},
  author = {Qiang Zhang and Enric Ventura and Jianchun Wu},
  journal= {arXiv preprint arXiv:1501.06723},
  year   = {2015}
}
R2 v1 2026-06-22T08:13:51.074Z