The distribution of large values of mixed character sums

Abstract

In this paper, we investigate the distribution of values of the complete exponential sum Sp,(θ)=Σn=1p (n)e(nθ), where p is a large prime, is a Dirichlet character (mod p) of order d≥ 2, and θ varies over certain subsets of [0,1]. When d=2, these sums correspond to the values of the Fekete polynomial associated with p on the unit circle. Our first result gives precise estimates for the tail of the distribution of |Sp,(θ)| in a large uniform range, when θ varies over the set \(k+1/2)/p\1≤ k≤ p. This improves upon a result of Conrey, Granville, Poonen, and Soundararajan. We also consider the distribution of the maximum of |Sp,(θ)| for θ∈ Ik=[k/p,(k+1)/p], and obtain upper and lower bounds for the distribution of large values of this maximum, valid in a uniform range that is nearly optimal: we make this precise in the paper. Our results provide strong support for a conjecture of Montgomery on the maximum of Fekete polynomials on the unit circle. In particular, we show that the distribution function exhibits double-exponential decay, with a surprising difference in behavior between the cases of even and odd order d.

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