Cohomological nonvanishing for algebraic fundamental groups of ball quotients

Abstract

Suppose < PU(n,1) is a cocompact arithmetic lattice of simplest type with profinite completion . This paper proves there is an open subgroup 0 such that Hj(, Fp) is nontrivial for every open subgroup 0, j 2n, and sufficiently large prime p. If n 2, nonvanishing is new for all j 2. Consequently, the virtual cohomological dimension of is at least 2n, improving the previous lower bound of 1. The proof shows there is a profinite fundamental class for the associated ball quotient and that its canonical class is profinite modulo torsion. For congruence and j < n+12, restriction Hj(, Fp) Hj(, Fp) is shown to be almost surjective in a precise sense; this is related to whether lattices in PU(n,1) are good in the sense of Serre, which is only known to hold for n=1.