The Laplace Transform of the Second Moment in the Gauss Circle Problem

Abstract

The Gauss circle problem concerns the difference P2(n) between the area of a circle of radius n and the number of lattice points it contains. In this paper, we study the Dirichlet series with coefficients P2(n)2, and prove that this series has meromorphic continuation to C. Using this series, we prove that the Laplace transform of P2(n)2 satisfies ∫0∞ P2(t)2 e-t/X \, dt = C X3/2 -X + O(X1/2+ε), which gives a power-savings improvement to a previous result of Ivic [Ivic1996]. Similarly, we study the meromorphic continuation of the Dirichlet series associated to the correlations r2(n+h)r2(n), where h is fixed and r2(n) denotes the number of representations of n as a sum of two squares. We use this Dirichlet series to prove asymptotics for Σn ≥ 1 r2(n+h)r2(n) e-n/X, and to provide an additional evaluation of the leading coefficient in the asymptotic for Σn ≤ X r2(n+h)r2(n).