Parabolic-preserving deformations of cusped hyperbolic lattices

Abstract

We study deformations of non-cocompact lattices of SO(n,1) into SU(n,1) and SO(n+1,1). A necessary condition for these deformations to remain discrete and faithful (when n ≥slant 3) is for the parabolic subgroups to remain parabolic and discrete; we call such representations strongly parabolic-preserving. We show that the figure-eight knot group admits a one-parameter family of Zariski-dense parabolic-preserving deformations into SU(3,1), with further deformations into SU(2,2). We also study the bending deformations of the Bianchi groups (seen as subgroups of SO(3,1)) along the modular surface into SU(3,1) and SO(4,1), and show that infinitely many of them are strongly parabolic-preserving in SU(3,1), while none are strongly parabolic-preserving in SO(4,1). Finally, for any n ≥slant 3, we show that there exist infinitely many non-commensurable cusped hyperbolic n-manifolds whose corresponding hyperbolic representation admits a 1-parameter family of parabolic-preserving deformations into SU(n,1).