Higher Moments for Lattice Point Discrepancy of Convex Domains and Annuli

Abstract

Given a domain ⊂eq R2, let D(,x,R) be the number of lattice points from Z2 in R-x, for R 1 and x∈ T2, minus the area of R: D(,x,R) = \# \ (j,k) ∈ Z2 :(j-x1,k-x2) ∈ R \ - R2||. We call ∫T2|D(,x,R)|pdx the p-th moment of the discrepancy function D. In 2014, Huxley showed that for convex domains with sufficiently smooth boundary, the fourth moment of D is bounded by O(R2 R), and in 2019, Colzani, Gariboldi and Gigante extended this result to higher dimensions. In this paper, our contribution is twofold: first, we present a simple direct proof of Huxley's 2014 result; second, we establish new estimates for the p-th moments of lattice point discrepancy of annuli of radius R, and any fixed thickness 0<t<1 for p 2.