BUGEAUD, Yann; DE MATHAN, Bernard

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BUGEAUD, Yann
Institut de Recherche Mathématique Avancée [IRMA]
Département de Mathématiques (Evry)

DE MATHAN, Bernard
Institut de Mathématiques de Bordeaux [IMB]

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Acta Arithmetica. 2009p. à paraître

Instytut Matematyczny PAN

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Let $d$ be a positive integer. Let $p$ be a prime number. Let $\alpha$ be a real algebraic number of degree $d+1$. We establish that there exist a positive constant $c$ and infinitely many algebraic numbers $\xi$ of degree $d$ such that $|\alpha - \xi| \cdot \min\{|\Norm(\xi)|_p,1\} < c H(\xi)^{-d-1} \, (\log 3 H(\xi))^{-1/d}$. Here, $H(\xi)$ and $\Norm(\xi)$ denote the na\"\i ve height of $\xi$ and its norm, respectively. This extends an earlier result of de Mathan and Teulié that deals with the case $d=1$.Read less <

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On a mixed problem in Diophantine approximation

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