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Equilibrium states of generic quantum systems subject to periodic driving

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abstract

When a closed quantum system is driven periodically with period $T$, it approaches a periodic state synchronized with the drive in which any local observable measured stroboscopically approaches a steady value. For integrable systems, the resulting behaviour is captured by a periodic version of a generalized Gibbs ensemble. By contrast, here we show that for generic non-integrable interacting systems, local observables become independent of the initial state entirely. Essentially, this happens because Floquet eigenstates of the driven system at quasienergy $\omega_\alpha$ consist of a mixture of the exponentially many eigenstates of the undriven Hamiltonian which are thus drawn from the entire extensive undriven spectrum. This is a form of equilibration which depends only on the Hilbert space of the undriven system and not on any details of its Hamiltonian.

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math-ph 1

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2026 1

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UNVERDICTED 1

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Thermalization with Gaussian Quantum Cellular Automata

math-ph · 2026-06-04 · unverdicted · novelty 5.0

Provides two sets of conditions on GQCAs guaranteeing thermalization to infinite temperature via a quantum many-body generalization of the Riemann-Lebesgue lemma for states with bounded density.

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  • Thermalization with Gaussian Quantum Cellular Automata math-ph · 2026-06-04 · unverdicted · none · ref 7 · internal anchor

    Provides two sets of conditions on GQCAs guaranteeing thermalization to infinite temperature via a quantum many-body generalization of the Riemann-Lebesgue lemma for states with bounded density.