English

A cofinite universal space for proper actions for mapping class groups

Geometric Topology 2009-01-05 v2 Group Theory

Abstract

We prove that the mapping class group Γg,n\Gamma_{g,n} for surfaces of negative Euler characteristic has a cofinite universal space \E\E for proper actions (the resulting quotient is a finite CWCW-complex). The approach is to construct a truncated Teichmueller space \Tg,n(ϵ)\T_{g,n}(\epsilon) by introducing a lower bound for the length of shortest closed geodesics and showing that \Tg,n(ϵ)\T_{g,n}(\epsilon) is a Γg,n\Gamma_{g,n} equivariant deformation retract of the Teichmueller space \Tg,n\T_{g, n}. The existence of such a cofinite universal space is important in the study of the cohomology of the group \gag\gag. As an application, we note that there are only finitely many conjugacy classes of finite subgroups of Γg,n\Gamma_{g,n}. Another application is that the rational Novikov conjecture in K-theory holds for Γg,n\Gamma_{g,n}.

Keywords

Cite

@article{arxiv.0811.3871,
  title  = {A cofinite universal space for proper actions for mapping class groups},
  author = {Lizhen Ji and Scott A. Wolpert},
  journal= {arXiv preprint arXiv:0811.3871},
  year   = {2009}
}
R2 v1 2026-06-21T11:44:41.662Z