Galois action on Fuchsian surface groups and their solenoids

Abstract

Let C be a complex algebraic curve uniformised by a Fuchsian group . In the first part of this paper we identify the automorphism group of the solenoid associated with with the Belyaev completion of its commensurator Comm() and we use this identification to show that the isomorphism class of this completion is an invariant of the natural Galois action of Gal( C/ Q) on algebraic curves. In turn this fact yields a proof of the Galois invariance of the arithmeticity of independent of Kazhhdan's. In the second part we focus on the case in which is arithmetic. The list of further Galois invariants we find includes: i) the periods of Comm(), ii) the solvability of the equations X2+2 2π2k+1 in the invariant quaternion algebra of and iii) the property of being a congruence subgroup.