Rank 1 deformations of non-cocompact hyperbolic lattices

Abstract

Let X be a negatively curved symmetric space and a non-cocompact lattice in Isom(X). We show that small, parabolic-preserving deformations of into the isometry group of any negatively curved symmetric space containing X remain discrete and faithful (the cocompact case is due to Guichard). This applies in particular to a version of Johnson-Millson bending deformations, providing for all n infnitely many non-cocompact lattices in SO(n,1) which admit discrete and faithful deformations into SU(n,1). We also produce deformations of the figure-8 knot group into SU(3,1), not of bending type, to which the result applies.