On Conjugation orbits of semisimple pairs in rank one

Abstract

We consider Lie groups SU(n,1) and Sp(n,1) that act as the isometries of the complex and quaternionic hyperbolic spaces respectively. We classify pairs of semisimple elements in Sp(n,1) and SU(n,1) up to conjugacy. This gives local parametrization of the representations in Hom(F2, G)/G such that both (x) and (y) are hyperbolics, where F2= x, y, G= Sp(n,1) or SU(n,1). We use the PSp(n,1)-configuration space M(n,i,m-i) of ordered m-tuples of points on H Hn, where first i points in an m-tuple are null points, to classify the semisimple pairs. Further, we also classify points on M(n,i,m-i).