Hamid Ben Yakkou, Brahim Boudine
Published 2024-06-30Version 1
Let $m$ be a rational integer $(m \neq 0, \pm 1)$ and consider a pure number field $K = \mathbb{Q} (\sqrt[n]{m}) $ with $n \ge 3$. Most papers discussing the monogenity of pure number fields focus only on the case where $m$ is square-free. In this paper, based on a classical theorem of Ore on the prime ideal decomposition \cite{MN92, O}, we study the monogenity of $K$ with $m$ is not necessarily square-free. As an application, several examples of the application of monogenic fields to CNS (Canonical Number System) are shown. In this way, our results extend some parts of previously established results \cite{BFC, BF, HNHCNS}.
Higher Newton polygons in the computation of discriminants and prime ideal decomposition in number fields
On indices and monogenity of quartic number fields defined by quadrinomials
On monogenity of certain pure number fields of degrees $2^r\cdot3^k\cdot7^s$
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