乘法p进近似值

Pub Date : 2021-01-01 DOI:10.1307/mmj/20195785

D. Badziahin, Y. Bugeaud

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引用次数: 4

摘要

设p是质数。我们给出了关于einsedler和Kleinbock猜想的一个特殊实例的几个结果，该猜想断言每个p进数x都满足inf,b∈Z∈{0}|ab|⋅|ax−b|p=0。我们强调这个猜想和(仍然开放的)p进Littlewood猜想之间的密切关系，根据这个猜想，每个实数ξ满足inf∈Z,q≠1q⋅‖qξ‖⋅|q|p=0。进一步，我们讨论了这些猜想在幂级数域上的类似物。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Multiplicative p -Adic Approximation

Let p be a prime number. We give several results towards a particular instance of a conjecture of Einsiedler and Kleinbock asserting that every p-adic number x satisfies inf a,b∈Z∖{0}|ab|⋅|ax−b|p=0. We highlight a close relationship between this conjecture and the (still open) p-adic Littlewood conjecture, according to which every real number ξ satisfies inf q∈Z,q⩾1q⋅‖qξ‖⋅|q|p=0. Furthermore, we discuss the analogues of these conjectures over fields of power series.

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