Geometric limits of cyclic subgroups of SO0(1, k+1) and SU(1, k+1)

Abstract

We study geometric limits of convex-cocompact cyclic subgroups of the rank 1 groups SO0(1, k+1) and SU(1, k+1). We construct examples of sequences of subgroups of such groups G that converge algebraically and whose geometric limit strictly contains the algebraic limit, thus generalizing the example first described by Jorgensen for subgroups of SO0(1,3). We also give necessary and sufficient conditions for a subgroup of SO0(1, k+1) to arise as geometric limit of a sequence of cyclic subgroups. We then discuss generalizations of such examples to sequence of representations of free groups, and applications of our constructions in that setting.