Residue sums of Dickson polynomials over finite fields

Pub Date : 2024-06-05 DOI:10.1016/j.jnt.2024.04.016
Thomas Brazelton , Joshua Harrington , Matthew Litman , Tony W.H. Wong
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Abstract

Given a polynomial with integral coefficients, one can inquire about the possible residues it can take in its image modulo a prime p. The sum over the distinct residues can sometimes be computed independent of the prime p; for example, Gauss showed that the sum over quadratic residues vanishes modulo a prime. In this paper we provide a closed form for the sum over distinct residues in the image of Dickson polynomials of arbitrary degree over finite fields of odd characteristic, and prove a complete characterization of the size of the value set. Our result provides the first non-trivial classification of such a sum for a family of polynomials of unbounded degree.

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有限域上狄克森多项式的残差和
给定一个具有积分系数的多项式,我们可以探究它在素数 p 的调制下在其图像中可能的残差。在本文中,我们提供了奇特征有限域上任意阶狄克森多项式映像中不同残差之和的封闭形式,并证明了值集大小的完整特征。我们的结果为无界度多项式族的此类和提供了第一个非难分类。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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