Maximal representations of uniform complex hyperbolic lattices
Abstract
Let be a maximal representation of a uniform lattice ⊂ SU(n,1), n≥ 2, in a classical Lie group of Hermitian type H. We prove that necessarily H= SU(p,q) with p≥ qn and there exists a holomorphic or antiholomorphic -equivariant map from complex hyperbolic space to the symmetric space associated to SU(p,q). This map is moreover a totally geodesic homothetic embedding. In particular, up to a representation in a compact subgroup of SU(p,q), the representation extends to a representation of SU(n,1) in SU(p,q).
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