Eigenvalues of congruence covers of geometrically finite hyperbolic manifolds

Abstract

Let G=SO(n,1) and Gamma a geometrically finite Zariski dense subgroup of G which is contained in an arithmetic subgroup of G. Denoting by Gamma(q) the principal congruence subgroup of Gamma of level q, and fixing a positive number λ0 strictly smaller than (n-1)2/4, we show that, as q tends to infinity along primes, the number of Laplacian eigenvalues of the congruence cover Gamma(q)\ Hn smaller than lambda0 is at most of order [Gamma:Gamma(q)]c for some c=c(λ0)>0.