On discreteness of subgroups of quaternionic hyperbolic isometries

Abstract

Let H Hn denote the n-dimensional quaternionic hyperbolic space. The linear group Sp(n,1) acts by the isometries of H Hn. A subgroup G of Sp(n,1) is called Zariski dense if it does not fix a point on H Hn ∂ H Hn and neither it preserves a totally geodesic subspace of H Hn. We prove that a Zariski dense subgroup G of Sp(n,1) is discrete if for every loxodromic element g ∈ G the two generator subgroup f, g f g-1 is discrete, where the generator f ∈ Sp(n,1) is certain fixed element not necessarily from G.