Second Moments in the Generalized Gauss Circle Problem

Abstract

The generalized Gauss circle problem concerns the lattice point discrepancy of large spheres. We study the Dirichlet series associated to Pk(n)2, where Pk(n) is the discrepancy between the volume of the k-dimensional sphere of radius n and the number of integer lattice points contained in that sphere. We prove asymptotics with improved power-saving error terms for smoothed sums, including Σ Pk(n)2 e-n/X and the Laplace transform ∫0∞ Pk(t)2 e-t/Xdt, in dimensions k ≥ 3. We also obtain main terms and power-saving error terms for the sharp sums Σn ≤ X Pk(n)2, along with similar results for the sharp integral ∫0X P3(t)2 dt. This includes producing the first power-saving error term in mean square for the dimension-three Gauss circle problem.