English

Second Moments in the Generalized Gauss Circle Problem

Number Theory 2019-12-04 v3

Abstract

The generalized Gauss circle problem concerns the lattice point discrepancy of large spheres. We study the Dirichlet series associated to Pk(n)2P_k(n)^2, where Pk(n)P_k(n) is the discrepancy between the volume of the kk-dimensional sphere of radius n\sqrt{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 Pk(n)2en/X\sum P_k(n)^2 e^{-n/X} and the Laplace transform 0Pk(t)2et/Xdt\int_0^\infty P_k(t)^2 e^{-t/X}dt, in dimensions k3k \geq 3. We also obtain main terms and power-saving error terms for the sharp sums nXPk(n)2\sum_{n \leq X} P_k(n)^2, along with similar results for the sharp integral 0XP3(t)2dt\int_0^X P_3(t)^2 dt. This includes producing the first power-saving error term in mean square for the dimension-three Gauss circle problem.

Cite

@article{arxiv.1703.10347,
  title  = {Second Moments in the Generalized Gauss Circle Problem},
  author = {Thomas A. Hulse and Chan Ieong Kuan and David Lowry-Duda and Alexander Walker},
  journal= {arXiv preprint arXiv:1703.10347},
  year   = {2019}
}

Comments

Now 36 pages + 7 page appendix. To appear in Forum of Mathematics Sigma

R2 v1 2026-06-22T19:01:57.758Z