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SUMS OF POLYNOMIAL-TYPE EXCEPTIONAL UNITS MODULO $\boldsymbol {n}$
Published online by Cambridge University Press: 21 July 2021
Abstract
Let $f(x)\in \mathbb {Z}[x]$ be a nonconstant polynomial. Let $n\ge 1, k\ge 2$ and c be integers. An integer a is called an f-exunit in the ring $\mathbb {Z}_n$ of residue classes modulo n if $\gcd (f(a),n)=1$ . We use the principle of cross-classification to derive an explicit formula for the number ${\mathcal N}_{k,f,c}(n)$ of solutions $(x_1,\ldots ,x_k)$ of the congruence $x_1+\cdots +x_k\equiv c\pmod n$ with all $x_i$ being f-exunits in the ring $\mathbb {Z}_n$ . This extends a recent result of Anand et al. [‘On a question of f-exunits in $\mathbb {Z}/{n\mathbb {Z}}$ ’, Arch. Math. (Basel)116 (2021), 403–409]. We derive a more explicit formula for ${\mathcal N}_{k,f,c}(n)$ when $f(x)$ is linear or quadratic.
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MSC classification
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- Research Article
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- © 2021 Australian Mathematical Publishing Association Inc.
Footnotes
S. F. Hong was partially supported by the National Science Foundation of China, Grant No. 11771304.
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