黄金分割的两种关系

Dal'nevostochnyi Matematicheskii Zhurnal Pub Date : 2021-12-10 DOI:10.47910/femj202116

A. A. Zhukova, A. Shutov

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引用次数: 0

摘要

V.G. Zhuravlev发现了两个与黄金分割率相关的关系:$\tau=\frac{1+\sqrt{5}}{2}$: $[([i\tau]+1)\tau]=[i\tau^2]+1$和$[[i\tau]\tau]+1=[i\tau^2]$。我们给出了这些关系的一个新的初等证明，并证明了它们给出了黄金分割的一个表征。进一步考虑了$i$ -s有限集的关系的可满足性，并建立了这种情况下的一些强迫性质。

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On two relations characterizing the golden ratio

V.G. Zhuravlev found two relations associated with the golden ratio: $\tau=\frac{1+\sqrt{5}}{2}$: $[([i\tau]+1)\tau]=[i\tau^2]+1$ and $[[i\tau]\tau]+1=[i\tau^2]$. We give a new elementary proof of these relations and show that they give a characterization of the golden ratio. Further we consider satisfability of our relations for finite sets of $i$-s and establish some forcing property for this situation.

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Dal'nevostochnyi Matematicheskii Zhurnal

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