Cusp and b1 growth for ball quotients and maps onto Z with finitely generated kernel

Abstract

Let M = B2 / be a smooth ball quotient of finite volume with first betti number b1(M) and let E(M) 0 be the number of cusps (i.e., topological ends) of M. We study the growth rates that are possible in towers of finite-sheeted coverings of M. In particular, b1 and E have little to do with one another, in contrast with the well-understood cases of hyperbolic 2- and 3-manifolds. We also discuss growth of b1 for congruence arithmetic lattices acting on B2 and B3. Along the way, we provide an explicit example of a lattice in PU(2, 1) admitting a homomorphism onto Z with finitely generated kernel. Moreover, we show that any cocompact arithmetic lattice ⊂ PU(n, 1) of simplest type contains a finite index subgroup with this property.