Lattice point counting statistics for 3-dimensional shrinking Cygan-Kor\'anyi spherical shells

Abstract

Let E(x;ω) be the error term for the number of integer lattice points lying inside a 3-dimensional Cygan-Kor\'anyi spherical shell of inner radius x and gap width ω(x)>0. Assuming that ω(x)0 as x∞, and that ω satisfies suitable regularity conditions, we prove that E(x;ω), properly normalized, has a limiting distribution. Moreover, we show that the corresponding distribution is moment-determinate, and we give a closed form expression for its moments. As a corollary, we deduce that the limiting distribution is the standard Gaussian measure whenever ω is slowly varying. We also construct gap width functions ω, whose corresponding error term has a limiting distribution that is absolutely continuous with a non-Gaussian density.