Wave functions in the Critical Phase: a Planar \textit{Sierpiński} Fractal Lattice

arXiv - PHYS - Other Condensed Matter Pub Date : 2024-06-23 DOI:arxiv-2406.16130

Qi Yao, Xiaotian Yang, Askar A. Iliasov, Mikhail I. Katsnelson, Shengjun Yuan

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Abstract

Electronic states play a crucial role in many quantum systems of moire superlattices, quasicrystals, and fractals. As recently reported in \textit{Sierpi\'{n}ski} lattices [Phys. Rev. B 107, 115424 (2023)], the critical states are revealed by the energy level-correlation spectra, which are caused by the interplay between aperiodicity and determined self-similarity characters. In the case of the \textit{Sierpi\'{n}ski Carpet}, our results further demonstrate that there is some degree of spatial overlap between these electronic states. These states could be strongly affected by its `seed lattice' of the $generator$, and slightly modulated by the dilation pattern and the geometrical self-similarity level. These electronic states are multifractal by scaling the $q$-order inverse participation ratio or fractal dimension, which correlates with the subdiffusion behavior. In the $gene$ pattern, the averaged state-based multifractal dimension of second-order would increase as its \textit{Hausdoff dimension} increases. Our findings could potentially contribute to understanding quantum transports and single-particle quantum dynamics in fractals.

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临界相中的波函数：平面textit{Sierpiński}分形晶格分形晶格

电子态在摩尔超晶格、准晶体和分形等许多量子系统中扮演着至关重要的角色。正如最近在（textit{Sierpi/'{n}ski}晶格中报道的那样[Phys. Rev. B 107, 115424 (2023)]，临界状态是由能级相关谱揭示的，而能级相关谱是由非周期性和确定的自相似性特征之间的相互作用引起的。在textit{Sierpi/'{n}ski 地毯}的情况下，我们的结果进一步证明了这些电子态之间存在一定程度的空间重叠。这些电子态可能会受到发生器 "种子晶格 "的强烈影响，并受到扩张模式和几何自相似性水平的轻微调制。这些电子态通过q$阶反参与比或分形维度的缩放而具有多分形性，这与亚扩散行为相关。在$基因$模式中，基于状态的二阶平均多分形维度会随着其textit{Hausdoff维度}的增加而增加。我们的发现可能有助于理解分形中的量子传输和单粒子量子力学。

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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arXiv - PHYS - Other Condensed Matter

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