Adelic Profinite Groups

## Abstract In this paper, we study a special class of compact quantum groups, namely, the profinite quantum groups.

Let G be a group, A a G-module, and H a subgroup of G. The standard Ž . Ž . cohomological transfer map from H \* H, A to H \* G, A is defined in the case that H is of finite index in G and is given explicitly in each dimension by a formula involving a sum over a set of representives for H \_ G. In t

Let H and K be quasiconvex subgroups of a negatively curved locally extended Ž . residually finite LERF group G. It is shown that if H is malnormal in G, then the double coset KH is closed in the profinite topology of G. In particular, this is true if G is the fundamental group of an atoroidal LERF

Let G G be a profinite group. The purpose of this note is to construct subfields F of the field of complex numbers over which a given finite dimensional complex continuous linear representation D of G G is realizable in the following sense: There is a one-dimensional representation of G G such that

## Abstract For 2__g__ – 2 + __n__ > 0, let Γ~__g, n__~ be the Teichmüller group of a compact Riemann surface of genus __g__ with __n__ points removed __S~g, n~__ , i.e., the group of homotopy classes of diffeomorphisms of __S~g, n~__ which preserve the orientation of __S~g, n~__ and a given order