Tilt-induced quasiperiodic potential on a square lattice produces a mobility-edge-embedded Hofstadter butterfly with fractal dimension 0.8-1.0.
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In finite 2D disordered systems, Anderson localization at low energies coexists with quantum scarring at higher energies due to energy-dependent localization lengths and finite-size effects, producing observable signatures in intensity patterns and spectral statistics.
Large-scale full-wave simulations show non-exponential transmission decay, isolated resonances with Thouless conductance below 1, and non-propagating intensity clusters as evidence for 3D Anderson localization of light in disordered dielectric media.
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Mobility-edge-embedded Hofstadter butterfly from a tilt-induced quasiperiodic potential
Tilt-induced quasiperiodic potential on a square lattice produces a mobility-edge-embedded Hofstadter butterfly with fractal dimension 0.8-1.0.
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Coexistence of Anderson Localization and Quantum Scarring in Two Dimensions
In finite 2D disordered systems, Anderson localization at low energies coexists with quantum scarring at higher energies due to energy-dependent localization lengths and finite-size effects, producing observable signatures in intensity patterns and spectral statistics.
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3D Anderson localization of light in disordered systems of dielectric particles
Large-scale full-wave simulations show non-exponential transmission decay, isolated resonances with Thouless conductance below 1, and non-propagating intensity clusters as evidence for 3D Anderson localization of light in disordered dielectric media.