Counting rational points of an algebraic variety over finite fields
Let $\mathbb{F}_q$ denote the finite field of odd characteristic $p$ with $q$ elements ($q=p^{n},n\in \mathbb{N} $) and $\mathbb{F}_q^*$ represent the nonzero elements of $\mathbb{F}_{q}$. In this paper, by using the Smith normal form we give an explicit formula for the number of rational points of...
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| Zusammenfassung: | Let $\mathbb{F}_q$ denote the finite field of odd characteristic $p$ with $q$
elements ($q=p^{n},n\in \mathbb{N} $) and $\mathbb{F}_q^*$ represent the
nonzero elements of $\mathbb{F}_{q}$. In this paper, by using the Smith normal
form we give an explicit formula for the number of rational points of the
algebraic variety defined by the following system of equations over
$\mathbb{F}_{q}$: \begin{align*} {\left\{\begin{array}{rl}
&\sum_{i=1}^{r_1}a_{1i}x_1^{e^{(1)}_{i1}} ...x_{n_1}^{e^{(1)}_{i,n_1}}
+\sum_{i=r_1+1}^{r_2}a_{1i}x_1^{e^{(1)}_{i1}}
...x_{n_2}^{e^{(1)}_{i,n_2}}-b_1=0,\\ &\sum_{j=1}^{r_3}a_{2j}x_1^{e^{(2)}_{j1}}
...x_{n_3}^{e^{(2)}_{j,n_3}} +\sum_{j=r_3+1}^{r_4}a_{2j}x_1^{e^{(2)}_{j1}}
...x_{n_4}^{e^{(2)}_{j,n_4}}-b_2=0, \end{array}\right.} \end{align*} where the
integers $1\leq r_1 |
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| DOI: | 10.48550/arxiv.1603.01828 |