NonLERFness of arithmetic hyperbolic manifold groups and mixed 3-manifold groups

Abstract

We will show that, for any noncompact arithmetic hyperbolic m-manifold with m> 3, and any compact arithmetic hyperbolic m-manifold with m> 4 that is not a 7-dimensional arithmetic hyperbolic manifold defined by octonions, its fundamental group is not LERF. The main ingredient in the proof is a study on abelian amalgamations of hyperbolic 3-manifold groups. We will also show that a compact orientable irreducible 3-manifold with empty or tori boundary supports a geometric structure if and only if its fundamental group is LERF.