Residual finiteness for central extensions of lattices in PU(n,1) and negatively curved projective varieties

Abstract

We study residual finiteness for cyclic central extensions of cocompact arithmetic lattices < PU(n,1) simple type. We prove that the preimage of in any connected cover of PU(n,1), in particular the universal cover, is residually finite. This follows from a more general theorem on residual finiteness of extensions whose characteristic class is contained in the span in H2(, Z) of the Poincar\'e duals to totally geodesic divisors on the ball quotient Bn. For n 4, if is a congruence lattice, we prove residual finiteness of the central extension associated with any element of H2(, Z). Our main application is to existence of cyclic covers of ball quotients branched over totally geodesic divisors. This gives examples of smooth projective varieties admitting a metric of negative sectional curvature that are not homotopy equivalent to a locally symmetric manifold. The existence of such examples is new for all dimensions n 4.