| 高斯和与有理点的计算 |
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| 引用本文: | 姜坤,高伟,曹炜.高斯和与有理点的计算[J].宁波大学学报(理工版),2020,33(1):65-68. |
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| 作者姓名: | 姜坤 高伟 曹炜 |
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| 作者单位: | 宁波大学 数学与统计学院, 浙江 宁波 315211 |
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| 基金项目: | 国家自然科学基金;宁波市自然科学基金 |
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| 摘 要: | 计算有限域上代数簇有理点个数是有限域研究中的重要课题. 设为q元有限域, f是上的非零多项式, Df为其次数矩阵, 用N(f)表示超曲面f=0在上的有理点个数. 若Df在剩余类环中与整数矩阵A行等价, 则记为Df ~qA. 利用高斯和给出了当Df ~q diag(), 其中∈{1, p1}, p1为q-1的一个素因子时N(f) 的具体表达式, 从而推广了已知的结论.
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| 关 键 词: | 有限域 有理点 高斯和 特征 |
Gauss sums and computation of rational points |
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| JIANG Kun,GAO Wei,CAO Wei.Gauss sums and computation of rational points[J].Journal of Ningbo University(Natural Science and Engineering Edition),2020,33(1):65-68. |
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| Authors: | JIANG Kun GAO Wei CAO Wei |
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| Institution: | School of Mathematics and Statistics, Ningbo University, Ningbo 315211, China |
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| Abstract: | It is important in the area of finite fields study to compute the number of rational points on algebraic varieties in finite fields. Let be the finite field of order q and f be a nonzero polynomial over with degree matrix Df; denote by N(f) the number of -rational points of the hypersurface defined by f=0; write Df ~qA when Df is row equivalent to an integer matrix A in the residue ring . Using Gauss sums, we obtain the explicit formula for N(f) in the case of Df ~q diag(), where and p1 is a prime divisor of q-1, which generalizes the known results. |
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| Keywords: | finite field rational point Gauss sum character |
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