A new permutationally invariant Bell inequality for qutrit systems yields a Bell operator whose maximal violation coincides with Poissonian spectral statistics due to emergent parity symmetry.
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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.
Semiclassical Herman-Kluk evolution matches quantum Wigner functions for multiple Ehrenfest times in a kicked system despite sub-Planckian classical filaments and islands affecting accuracy.
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Nonlocality, Integrability and Quantum Chaos in the Spectrum of Bell Operators
A new permutationally invariant Bell inequality for qutrit systems yields a Bell operator whose maximal violation coincides with Poissonian spectral statistics due to emergent parity symmetry.
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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.
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Semiclassical evolution in phase space for a softly chaotic system
Semiclassical Herman-Kluk evolution matches quantum Wigner functions for multiple Ehrenfest times in a kicked system despite sub-Planckian classical filaments and islands affecting accuracy.