On the procongruence completion of the Teichmüller modular group

Abstract:

For $2g-2+n>0$, the Teichmüller modular group $\Gamma _{g,n}$ of a compact Riemann surface of genus $g$ with $n$ points removed, $S_{g,n}$ is the group of homotopy classes of diffeomorphisms of $S_{g,n}$ which preserve the orientation of $S_{g,n}$ and a given order of its punctures. Let $\Pi _{g,n}$ be the fundamental group of $S_{g,n}$, with a given base point, and $\hat {\Pi }_{g,n}$ its profinite completion. There is then a natural faithful representation $\Gamma _{g,n}\hookrightarrow \mathrm {Out}(\hat {\Pi }_{g,n})$. The procongruence Teichmüller group $\check {\Gamma }_{g,n}$ is defined to be the closure of the Teichmüller group $\Gamma _{g,n}$ inside the profinite group $\mathrm {Out}(\hat {\Pi }_{g,n})$.

In this paper, we begin a systematic study of the procongruence completion $\check {\Gamma }_{g,n}$. The set of profinite Dehn twists of $\check {\Gamma }_{g,n}$ is the closure, inside this group, of the set of Dehn twists of $\Gamma _{g,n}$. The main technical result of the paper is a parametrization of the set of profinite Dehn twists of $\check {\Gamma }_{g,n}$ and the subsequent description of their centralizers (Sections 5 and 6). This is the basis for the Grothendieck-Teichmüller Lego with procongruence Teichmüller groups as building blocks.

As an application, in Section 7, we prove that some Galois representations associated to hyperbolic curves over number fields and their moduli spaces are faithful.