Related papers: Dissipation-Induced Threshold on Integrability Footprints

Dissipation-Induced Threshold on Integrability Footprints

URL: http://arxiv.org/abs/2504.10255v1
Date: Mon, 14 Apr 2025 14:16:37 GMT
Title: Dissipation-Induced Threshold on Integrability Footprints
Authors: Rodrigo M. C. Pereira, Nadir Samos Sáenz de Buruaga, Kristian Wold, Lucas Sá, Sergey Denisov, Pedro Ribeiro,
Abstract summary: We study how signatures of integrability fade as dissipation strength increases.<n>We estimate the critical dissipation threshold beyond which these clusters disappear.<n>Our results provide a quantitative picture of how noise gradually erases the footprints of integrability in open quantum systems.
Score: 1.0159681653887238
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: The presence of a dissipative environment disrupts the unitary spectrum of dynamical quantum maps. Nevertheless, key features of the underlying unitary dynamics -- such as their integrable or chaotic nature -- are not immediately erased by dissipation. To investigate this, we model dissipation as a convex combination of a unitary evolution and a random Kraus map, and study how signatures of integrability fade as dissipation strength increases. Our analysis shows that in the weakly dissipative regime, the complex eigenvalue spectrum organizes into well-defined, high-density clusters. We estimate the critical dissipation threshold beyond which these clusters disappear, rendering the dynamics indistinguishable from chaotic evolution. This threshold depends only on the number of spectral clusters and the rank of the random Kraus operator. To characterize this transition, we introduce the eigenvalue angular velocity as a diagnostic of integrability loss. We illustrate our findings through several integrable quantum circuits, including the dissipative quantum Fourier transform. Our results provide a quantitative picture of how noise gradually erases the footprints of integrability in open quantum systems.

Related papers

Spectral truncation of out-of-time-ordered correlators in dissipative system [44.99833362998488]
Out-of-time-ordered correlators (OTOCs) have emerged as powerful tools for diagnosing quantum chaos and information scrambling.<n>We investigate the spectral decomposition of OTOCs in open quantum systems using the dissipative modified kicked rotator (DMKR) as a paradigmatic model.<n>Our results provide a quantitative framework for understanding OTOCs in dissipative quantum systems and suggest new avenues for experimental exploration in open quantum platforms.
arXiv Detail & Related papers (2025-03-05T17:22:25Z)
A New Framework for Quantum Phases in Open Systems: Steady State of Imaginary-Time Lindbladian Evolution [18.47824812164327]
We introduce the concept of imaginary-time Lindbladian evolution as an alternative framework. This new approach defines gapped quantum phases in open systems through the spectrum properties of the imaginary-Liouville superoperator.
arXiv Detail & Related papers (2024-08-06T14:53:40Z)
Dynamical signatures of non-Markovianity in a dissipative-driven qubit [0.0]
We investigate signatures of non-Markovianity in the dynamics of a periodically-driven qubit coupled to a bosonic environment. Non-Markovian features are quantified by comparing on an equal footing the predictions from diverse and complementary approaches to quantum dissipation.
arXiv Detail & Related papers (2024-01-17T15:58:50Z)
Robustness of chaotic behavior in iterated quantum protocols [0.0]
A quantum circuit with a Hadamard gate and a measurement on one of the outputs is known to lead to chaotic dynamics when applied iteratively on an ensemble of equally prepared qubits. We examine how the ideal evolution is distorted in the presence of both coherent error and incoherent initial noise. Our results allow to identify reliable regimes of operation of iterative protocols.
arXiv Detail & Related papers (2023-11-22T09:59:32Z)
A Lie Algebraic Theory of Barren Plateaus for Deep Parameterized Quantum Circuits [37.84307089310829]
Variational quantum computing schemes train a loss function by sending an initial state through a parametrized quantum circuit. Despite their promise, the trainability of these algorithms is hindered by barren plateaus. We present a general Lie algebra that provides an exact expression for the variance of the loss function of sufficiently deep parametrized quantum circuits.
arXiv Detail & Related papers (2023-09-17T18:14:10Z)
Quantifying operator spreading and chaos in Krylov subspaces with quantum state reconstruction [0.0]
We study operator spreading in many-body quantum systems by its potential to generate an informationally complete measurement record. We generate the measurement record as a series of expectation values of an observable evolving under the desired dynamics. We find that the amount of operator spreading, as quantified by the fidelity in quantum tomography, increases with the degree of chaos in the system.
arXiv Detail & Related papers (2023-08-16T17:10:00Z)
Decimation technique for open quantum systems: a case study with driven-dissipative bosonic chains [62.997667081978825]
Unavoidable coupling of quantum systems to external degrees of freedom leads to dissipative (non-unitary) dynamics. We introduce a method to deal with these systems based on the calculation of (dissipative) lattice Green's function. We illustrate the power of this method with several examples of driven-dissipative bosonic chains of increasing complexity.
arXiv Detail & Related papers (2022-02-15T19:00:09Z)
Sensing quantum chaos through the non-unitary geometric phase [62.997667081978825]
We propose a decoherent mechanism for sensing quantum chaos. The chaotic nature of a many-body quantum system is sensed by studying the implications that the system produces in the long-time dynamics of a probe coupled to it.
arXiv Detail & Related papers (2021-04-13T17:24:08Z)
Glassy quantum dynamics of disordered Ising spins [0.0]
We study the out-of-equilibrium dynamics in the quantum Ising model with power-law interactions and positional disorder. Numerically, we confirm that glassy behavior persists for finite system sizes and sufficiently strong disorder.
arXiv Detail & Related papers (2021-04-01T09:08:27Z)
Continuous-time dynamics and error scaling of noisy highly-entangling quantum circuits [58.720142291102135]
We simulate a noisy quantum Fourier transform processor with up to 21 qubits. We take into account microscopic dissipative processes rather than relying on digital error models. We show that depending on the dissipative mechanisms at play, the choice of input state has a strong impact on the performance of the quantum algorithm.
arXiv Detail & Related papers (2021-02-08T14:55:44Z)
Quantum particle across Grushin singularity [77.34726150561087]
We study the phenomenon of transmission across the singularity that separates the two half-cylinders. All the local realisations of the free (Laplace-Beltrami) quantum Hamiltonian are examined as non-equivalent protocols of transmission/reflection. This allows to comprehend the distinguished status of the so-called bridging' transmission protocol previously identified in the literature.
arXiv Detail & Related papers (2020-11-27T12:53:23Z)
The role of boundary conditions in quantum computations of scattering observables [58.720142291102135]
Quantum computing may offer the opportunity to simulate strongly-interacting field theories, such as quantum chromodynamics, with physical time evolution. As with present-day calculations, quantum computation strategies still require the restriction to a finite system size. We quantify the volume effects for various $1+1$D Minkowski-signature quantities and show that these can be a significant source of systematic uncertainty.
arXiv Detail & Related papers (2020-07-01T17:43:11Z)
Entanglement revivals as a probe of scrambling in finite quantum systems [0.0]
We show that for integrable systems the height of the dip of the entanglement of an interval of fixed length decays as a power law with the total system size. While for integrable systems the height of the dip of the entanglement of an interval of fixed length decays as a power law with the total system size, upon breaking integrability a much faster decay is observed, signalling strong scrambling.
arXiv Detail & Related papers (2020-04-18T21:30:30Z)

This list is automatically generated from the titles and abstracts of the papers in this site.