Rigidity at infinity for lattices in rank-one Lie groups

Abstract

Let be a non-uniform lattice in PU(p,1) without torsion and with p≥2 . We introduce the notion of volume for a representation : → PU(m,1) where m ≥ p. We use this notion to generalize the Mostow--Prasad rigidity theorem. More precisely, we show that given a sequence of representations n: → PU(m,1) such that n ∞ Vol(n) =Vol(M), then there must exist a sequence of elements gn ∈ PU(m,1) such that the representations gn n gn-1 converge to a reducible representation ∞ which preserves a totally geodesic copy of HpC and whose HpC-component is conjugated to the standard lattice embedding i: → PU(p,1) < PU(m,1). Additionally, we show that the same definitions and results can be adapted when is a non-uniform lattice of PSp(p,1) without torsion and for representations : → PSp(m,1), still mantaining the hypothesis m ≥ p ≥ 2.