Improved Tail Estimates for the Distribution of Quadratic Weyl Sums

Abstract

We consider quadratic Weyl sums SN(x;c,α)=Σn=1N\2π i((12n2+cn)x+α n)\ for c=α=0 (the rational case) or (c,α)2 (the irrational case), where x is randomly distributed according to a probability measure absolutely continuous with respect to the Lebesgue measure. The limiting distribution in the complex plane of 1NSN(x;c,α) as N∞ was described by Marklof [13] (respectively Cellarosi and Marklof [5]) in the rational (resp. irrational) case. According to the limiting distribution, the probability of landing outside a ball of radius R is known to be asymptotic to 4 2π2R-4(1+o(1)) in the rational case and to 6π2R-6(1+O(R-12/31)) in the irrational case, as R∞. In this work we refine the technique of Cellarosi and Marklof [5] to improve the known tail estimates to 4 2π2R-4(1+O(R-2+)) and 6π2R-6(1+O(R-2+)) for every >0. In the rational case, we rely on the equidistribution of a rational horocycle lift to a torus bundle over the unit tangent bundle to the classical modular surface. All the constants implied by the O-notations are made explicit