Constructs a class of static geometrically local Hamiltonians whose connected spectral form factor exhibits the BKP random-matrix ramp within a symmetry sector by embedding dual-unitary Floquet spectra.
Random Permutation Circuits Beyond Qubits are Quantum Chaotic,
2 Pith papers cite this work. Polarity classification is still indexing.
2
Pith papers citing it
verdicts
UNVERDICTED 2representative citing papers
Conditioning on rare boundary measurement outcomes in a quantum East circuit generates states with finite two-point correlations at arbitrary distances and an underlying Sierpiński-triangle fractal structure.
citing papers explorer
-
Provable random-matrix spectral ramp in a static, geometrically local Hamiltonian
Constructs a class of static geometrically local Hamiltonians whose connected spectral form factor exhibits the BKP random-matrix ramp within a symmetry sector by embedding dual-unitary Floquet spectra.
-
Exact large deviations and emergent long-range correlations in sequential quantum East circuits
Conditioning on rare boundary measurement outcomes in a quantum East circuit generates states with finite two-point correlations at arbitrary distances and an underlying Sierpiński-triangle fractal structure.