Determining Fuchsian groups by their finite quotients

Abstract

Let () be the set of isomorphism classes of the finite groups that are homomorphic images of . We investigate the extent to which () determines when is a group of geometric interest. If 1 is a lattice in PSL(2,) and 2 is a lattice in any connected Lie group, then (1) = (2) implies that 1 is isomorphic to 2. If F is a free group and is a right-angled Artin group or a residually free group (with one extra condition), then (F)=() implies that F. If 1<PSL(2, C) and 2< G are non-uniform arithmetic lattices, where G is a semi-simple Lie group with trivial centre and no compact factors, then (1)= (2) implies that G PSL(2, C) and that 2 belongs to one of finitely many commensurability classes. These results are proved using the theory of profinite groups; we do not exhibit explicit finite quotients that distinguish among the groups in question. But in the special case of two non-isomorphic triangle groups, we give an explicit description of finite quotients that distinguish between them.