English

Congruence topologies on the mapping class group

Group Theory 2018-04-18 v1 Algebraic Geometry

Abstract

Let Γ(S)\Gamma(S) be the pure mapping class group of a connected orientable surface SS of negative Euler characteristic. For C{\mathscr C} a class of finite groups, let π^1(S)C\hat{\pi}_1(S)^{\mathscr C} be the pro-C{\mathscr C} completion of the fundamental group of SS. The \emph{C{\mathscr C}-congruence completion Γˇ(S)C\check{\Gamma}(S)^{\mathscr C} of Γ(S)\Gamma(S)} is the profinite completion induced by the embedding Γ(S)Out(π^1(S)C)\Gamma(S)\hookrightarrow{\operatorname{Out}}(\hat{\pi}_1(S)^{\mathscr C}). In this paper, we begin a systematic study of such completions for different C{\mathscr C}. We show that the combinatorial structure of the profinite groups Γˇ(S)C\check{\Gamma}(S)^{\mathscr C} closely resemble that of Γ(S)\Gamma(S). A fundamental question is how C{\mathscr C}-congruence completions compare with pro-C{\mathscr C} completions. Even though, in general (e.g.\ for C{\mathscr C} the class of finite solvable groups), Γˇ(S)C\check{\Gamma}(S)^{\mathscr C} is not even virtually a pro-C{\mathscr C} group, we show that, for Z/2C{\mathbb Z}/2\in{\mathscr C}, g(S)2g(S)\leq 2 and SS open, there is a natural epimorphism from the C{\mathscr C}-congruence completion Γˇ(S)(2)C\check{\Gamma}(S)(2)^{\mathscr C} of the abelian level of order 22 to its pro-C{\mathscr C} completion Γ^(S)(2)C\widehat{\Gamma}(S)(2)^{\mathscr C}. In particular, this is an isomorphism for the class of finite groups and for the class of 22-groups. Moreover, in these two cases, the result also holds for a closed surface.

Keywords

Cite

@article{arxiv.1804.06322,
  title  = {Congruence topologies on the mapping class group},
  author = {Marco Boggi},
  journal= {arXiv preprint arXiv:1804.06322},
  year   = {2018}
}

Comments

33 pages

R2 v1 2026-06-23T01:26:37.804Z