An exact Thouless-derived identity for Lyapunov exponents constrains mobility edge locations to a reduced energy set in bichromatic Aubry-André models, enforcing linear critical scaling with ν=1 and a non-universal energy-dependent prefactor near self-duality.
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Higher moments of the projected process ensemble reveal entanglement structures that distinguish chaotic from integrable dynamics more sharply than quantum dynamical or spatiotemporal entropies.
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Structural constraints on mobility edges in one-dimensional quasiperiodic systems
An exact Thouless-derived identity for Lyapunov exponents constrains mobility edge locations to a reduced energy set in bichromatic Aubry-André models, enforcing linear critical scaling with ν=1 and a non-universal energy-dependent prefactor near self-duality.
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Diagnosing chaos with projected ensembles of process tensors
Higher moments of the projected process ensemble reveal entanglement structures that distinguish chaotic from integrable dynamics more sharply than quantum dynamical or spatiotemporal entropies.