由积分部分的商生成的乘法群

IF 0.6 3区 数学 Q3 MATHEMATICS Periodica Mathematica Hungarica Pub Date : 2024-07-03 DOI:10.1007/s10998-024-00599-w
Artūras Dubickas
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引用次数: 0

摘要

对于固定的正数 \(\alpha \ne \beta \),我们考虑乘法群 \({\mathcal {F}}_{\alpha 、\形式的有理数产生的乘法群,其中 \(n in {\mathbb {N}}\) and\(nge \max \big (\frac{1}\{alpha },\frac{1}\{beta }\big )\).对于 \(0<\alpha <1\) 和 \(\beta =1/),我们证明 \({\mathcal {F}}_\{alpha ,1}\) 是最大的可能群,即它是所有正有理数的乘法群 \({/mathbb {Q}}^{+}\).同样的等式 \({\mathcal {F}}_{\alpha ,\beta }=\{mathbb {Q}}^{+}\) 在 \(0< 10 \alpha \le \beta <1\) 的情况下也成立。这些结果产生了无限多的对((\alpha ,\beta)\), (\alpha \ne \beta),对于这些对,Kátai和Phong提出的猜想可以得到证实。之前唯一已知的例子是((\alpha ,\beta)=(\sqrt{2},1)\)。在这种情况下,我们也给出了一个新的证明,它比 Kátai 和 Phong 最初的证明要简单得多。更广义地说,我们猜想,如果至少有一个数 \(\alpha ,\beta >0\) 不是整数,那么对于 \(\alpha \ne \beta \) 来说,({/mathcal {F}}_{\alpha ,\beta }={\mathbb {Q}}^{+}\) 就是整数。
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Multiplicative group generated by quotients of integral parts

For fixed positive numbers \(\alpha \ne \beta \), we consider the multiplicative group \({\mathcal {F}}_{\alpha ,\beta }\) generated by the rational numbers of the form \(\frac{\lfloor \alpha n\rfloor }{\lfloor \beta n\rfloor }\), where \(n \in {\mathbb {N}}\) and \(n \ge \max \big (\frac{1}{\alpha },\frac{1}{\beta }\big )\). For \(0<\alpha <1\) and \(\beta =1\), we prove that \({\mathcal {F}}_{\alpha ,1}\) is the maximal possible group, namely, it is the multiplicative group of all positive rational numbers \({\mathbb {Q}}^{+}\). The same equality \({\mathcal {F}}_{\alpha ,\beta }={\mathbb {Q}}^{+}\) holds in the case when \(0< 10 \alpha \le \beta <1\). These results produce infinitely many pairs \((\alpha ,\beta )\), \(\alpha \ne \beta \), for which a conjecture posed by Kátai and Phong can be confirmed. The only previously known such example is \((\alpha ,\beta )=(\sqrt{2},1)\). We also give a new proof in that case, which is much simpler than the original proof of Kátai and Phong. More generally, we conjecture that \({\mathcal {F}}_{\alpha ,\beta }={\mathbb {Q}}^{+}\) for \(\alpha \ne \beta \) if at least one of the numbers \(\alpha ,\beta >0\) is not an integer.

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来源期刊
CiteScore
1.40
自引率
0.00%
发文量
67
审稿时长
>12 weeks
期刊介绍: Periodica Mathematica Hungarica is devoted to publishing research articles in all areas of pure and applied mathematics as well as theoretical computer science. To be published in the Periodica, a paper must be correct, new, and significant. Very strong submissions (upon the consent of the author) will be redirected to Acta Mathematica Hungarica. Periodica Mathematica Hungarica is the journal of the Hungarian Mathematical Society (János Bolyai Mathematical Society). The main profile of the journal is in pure mathematics, being open to applied mathematical papers with significant mathematical content.
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