Shuangnian Hu scite author profile

Shuangnian Hu

4Publications

5Citation Statements Received

117Citation Statements Given

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Nanyang Institute of Technology, Zhengzhou University

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The Number of Rational Points of a Family of Algebraic Varieties over Finite Fields

Zhao

2017

Algebra Colloq.

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Let F q stand for the finite field of odd characteristic p with q elements (q = p n , n ∈ N) and F * q denote the set of all the nonzero elements of F q . Let m and t be positive integers. In this paper, by using the Smith normal form of the exponent matrix, we obtain a formula for the number of rational points on the variety defined by the following system of equations over F q :where the integers t > 0, r 0 = 0 < r 1 < r 2 < ... < r t , 1 ≤ n 1 < n 2 < ... < n t , 0 ≤ j ≤ t − 1, b k ∈ F q , a k,i ∈ F * q , (k = 1, ..., m, i = 1, ..., r t ), and the exponent of each variable is a positive integer. Furthermore, under some natural conditions, we arrive at an explicit formula for the number of the above variety. It extends the results obtained previously by Wolfmann, Sun, Wang, Song, Chen, Hong, Hu and Zhao et al. Our result also answers completely an open problem raised by Song and Chen.

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Counting Rational Points of an Algebraic Variety over Finite Fields

Qin

Zhao

2019

Results Math

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Multiple gcd-closed sets and determinants of matrices associated with arithmetic functions

Hong

2016

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Counting rational points of an algebraic variety over finite fields

Hu¹,

Hong²,

Qin³

2016

Preprint

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Shuangnian Hu

The Number of Rational Points of a Family of Algebraic Varieties over Finite Fields

Counting Rational Points of an Algebraic Variety over Finite Fields

Multiple gcd-closed sets and determinants of matrices associated with arithmetic functions

Counting rational points of an algebraic variety over finite fields

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