Perturbed random Floquet-Clifford circuits exhibit operator-space fragmentation into wall-separated sectors for p < 1, yielding exact local integrals of motion, tunable operator spreading length, an entanglement bottleneck, and a pre-RMT fragmentation timescale at p = 1.
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The generalized Aubry-André model exhibits an ergodic-MBL transition whose critical disorder strength is characterized via the Frobenius norm of the adiabatic gauge potential, with finite-size scaling and Thouless time analysis.
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Operator space fragmentation in perturbed Floquet-Clifford circuits
Perturbed random Floquet-Clifford circuits exhibit operator-space fragmentation into wall-separated sectors for p < 1, yielding exact local integrals of motion, tunable operator spreading length, an entanglement bottleneck, and a pre-RMT fragmentation timescale at p = 1.
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Characterization of Thermalization Behaviour in a Generalized Aubry-Andr\'e Model
The generalized Aubry-André model exhibits an ergodic-MBL transition whose critical disorder strength is characterized via the Frobenius norm of the adiabatic gauge potential, with finite-size scaling and Thouless time analysis.