Related papers: Family of self-dual quasicrystals with critical Phases

Family of self-dual quasicrystals with critical Phases

URL: http://arxiv.org/abs/2504.20495v3
Date: Wed, 22 Oct 2025 02:47:34 GMT
Title: Family of self-dual quasicrystals with critical Phases
Authors: Wenzhi Wang, Wei Yi, Tianyu Li,
Abstract summary: We build self-dual one-dimensional quasiperiodic lattice models with arbitrary-range hoppings and multifractal behaviors.<n>We exploit the fact that, when the self-dual condition is satisfied, the system must be in the critical state with multifractal properties.
Score: 11.834143719106917
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: We propose a general framework for constructing self-dual one-dimensional quasiperiodic lattice models with arbitrary-range hoppings and multifractal behaviors. Our framework generates a broad spectrum of one dimensional quasicrystals, ranging from the off-diagonal Aubry-Andr\'e-Harper models on one end, to those featuring long-range hoppings with varied quasiperiodic modulations on another. Focusing on models with off-diagonal quasiperiodic hoppings with power-law decay, we exploit the fact that, when the self-dual condition is satisfied, the system must be in the critical state with multifractal properties. This enables the engineering of models with competing extended, critical, and localized phases, with richly structured mobility edges separating them. As an outstanding example, we show that a limiting case of our family of self-dual quasicrystals can be implemented using Rydberg-atom arrays. Our work offers a systematic route toward critical phases from self-duality considerations, and would facilitate the experimental simulation of these exotic states.

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