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Exceptional spectrum and dynamic magnetization.

Journal of physics. Condensed matter : an Institute of Physics journal·2022
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Updated: Nov 1, 2025

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Localization transitions and mobility edges in quasiperiodic ladder.

R Wang1, X M Yang1, Z Song1

  • 1School of Physics, Nankai University, Tianjin 300071, People's Republic of China.

Journal of Physics. Condensed Matter : an Institute of Physics Journal
|June 22, 2021
PubMed
Summary
This summary is machine-generated.

We studied quasiperiodic chains and found mobility edges, which are transition points between localized and extended states. These edges can be detected using a dynamical method in engineered Moiré superlattices.

Keywords:
Moiré ladderdynamical detectionlocalization transitionmobility edgequasiperiodic laddersurvival probability

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Area of Science:

  • Condensed matter physics
  • Quantum mechanics
  • Disordered systems

Background:

  • Localization phenomena in disordered systems are crucial for understanding wave transport.
  • Quasiperiodic potentials offer a unique route to explore transitions between ordered and disordered states.
  • Ladder systems provide a tunable platform for investigating complex localization behaviors.

Purpose of the Study:

  • To investigate the localization properties of two-coupled uniform chains with quasiperiodic modulation.
  • To explore the existence and detection of mobility edges in such systems.
  • To propose and analyze an experimentally feasible quasiperiodic Moiré superlattice ladder.

Main Methods:

  • Analytical and numerical methods were employed to study the system's properties.
  • Equivalence to Aubry-André chains was established for symmetric ladder systems.
  • Numerical simulations were used to confirm the presence of mobility edges in asymmetric systems.
  • A dynamical method involving survival probability measurement was proposed for detecting mobility edges.

Main Results:

  • The studied ladder system exhibits localization properties.
  • Symmetric ladder systems are equivalent to two Aubry-André chains.
  • Asymmetric ladder systems display mobility edges.
  • The proposed Moiré superlattice ladder supports mobility edges.
  • Mobility edges can be detected via a dynamical method using an imaginary negative potential.

Conclusions:

  • The research provides insights into localization transitions and the emergence of mobility edges in quasiperiodic systems.
  • The proposed Moiré superlattice ladder offers a practical platform for experimental investigations.
  • The dynamical detection method offers a new avenue for probing localization phenomena.