Local coordinates for complex and quaternionic hyperbolic pairs

Abstract

Let G(n)= Sp(n,1) or SU(n,1). We classify conjugation orbits of generic pairs of loxodromic elements in G(n). Such pairs, called `non-singular', were introduced by Gongopadhyay and Parsad for SU(3,1). We extend this notion and classify G(n)-conjugation orbits of such elements in arbitrary dimension. We prove that the set given by non-singular pairs in G(n) is `small' for n ≥ 4. However, for n=3, they give a subspace that can be parametrized using a set of coordinates whose local dimension equals the dimension of the underlying group. We further construct twist-bend parameters to glue such representations and obtain local parametrization for generic representations of the fundamental group of a closed oriented surface into G(3).