Lattice Point Counting in Sectors of Hyperbolic 3-space

Abstract

Let be a cocompact discrete subgroup of PSL2(C) and denote by H the three dimensional upper half-space. For a p∈H, we count the number of points in the orbit p, according to their distance, arccosh X, from a totally geodesic hyperplane. The main term in n dimensions was obtained by Herrmann for any subset of a totally geodesic submanifold. We prove a pointwise error term of O(X3/2) by extending the method of Huber and Chatzakos-Petridis to three dimensions. By applying Chamizo's large sieve inequalities we obtain the conjectured error term O(X1+ε) on average in the spatial aspect. We prove a corresponding large sieve inequality for the radial average and explain why it only improves on the pointwise bound by 1/6.