arXiv:2109.07062 Abstract | arXiv Analytics

arXiv:2109.07062 [cond-mat.dis-nn]Abstract References Reviews Resources

Fractal Spectrum of the Aubry-Andre Model

Published 2021-09-15Version 1

The Aubry-Andre model is a one-dimensional lattice model for quasicrystals with localized and delocalized phases. At the localization transition point, the system displays fractal spectrum, which relates to the Hofstadter butterfly. In this work, we uncover the exact self-similarity structures in the energy spectrum. We separate the fractal structures into two parts: the fractal filling positions of gaps and the scaling of gap sizes. We show that the fractal fillings emerge for a certain type of incommensurate periodicity regardless of potential strength. However, the power-law scaling of gap sizes is characteristic for general incommensurability at the critical point of the model.

Comments: 5 pages, 3 figures

Categories: cond-mat.dis-nn, cond-mat.str-el

Keywords: aubry-andre model, gap sizes, system displays fractal spectrum, one-dimensional lattice model, fractal fillings emerge

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