On profinite rigidity, Grothendieck pairs, and the second homology of some 3-orbifold groups

Abstract

The second homology group is of central importance in the study of profinite rigidity of 3-manifold groups. Although general and deep results imply that the integral homology of cocompact hyperbolic 3-orbifold groups is computable in principle, the resulting algorithm is not practical. We develop an effective method for computing H2 in the case of orbifold groups arising as finite extensions of the fundamental group of hyperbolic rational homology 3-spheres. As a special case, this yields explicit computations of the second homology groups of all cocompact lattices between π1(W) and its normalizer in PSL2( C), where W is the Weeks manifold. We also show that these lattices are absolutely profinitely rigid, completing work by Bridson, McReynolds, Reid & Spitler in this setting. As a special case, we determine that H2(ΓO, Z) Z / 2Z, where ΓO is the normalizer of the group of units ΓO1 in a choice of maximal order O of the quaternion algebra associated to W, thereby answering a question of Bridson & Reid. Although this non-vanishing obstructs one possible construction of Grothendieck pairs in ΓO1 × ΓO1, we use our computations to show the vanishing of the second homology of another lattice whose derived subgroup is ΓO1, which then yields Grothendieck pairs in this direct product by a theorem of Bridson & Reid. Finally, to showcase the generality of the techniques, we also compute the second homology of some finite extensions by orientable isometries of the fundamental group of some Fibonacci manifolds Mn.