Title: Robustness of Quantum Chaos and Anomalous Relaxation in Open Quantum Circuits

Abstract: Dissipation is a ubiquitous phenomenon in nature that affects the fate of chaotic quantum dynamics. To characterize the interplay between quantum chaos and dissipation in generic quantum many-body systems, we consider a minimal dissipative Floquet many-body circuit. In particular, we study the dissipative form factor (DFF), an extension of the spectral form factor to open quantum systems, of Floquet systems in the presence of arbitrary on-site dissipation modeled by quantum channels. For a solvable model, in the limit of large local Hilbert space dimension, we obtain an exact expression for the DFF averaged over the random unitary gates, with simple, closed-form expressions in the limit of large times. We find that, for long enough times, the system always relaxes (i.e., the DFF decays) with two distinctive regimes characterized by the presence or absence of gap-closing. While the system can sustain a robust ramp for a long (but finite) time interval in the gap-closing regime, relaxation is "assisted" by quantum chaos in the regime where the gap remains nonzero. In the latter regime, we find that, if the thermodynamic limit is taken first, the gap does not close even in the dissipationless limit, a recently uncovered phenomenon dubbed anomalous relaxation. We complement our findings with numerical results for quantum circuits with a small Hilbert space dimension.