Related papers: Dynamical metastability and transient topological magnons in interacting driven-dissipative magnetic systems

Dynamical metastability and transient topological magnons in interacting driven-dissipative magnetic systems

URL: http://arxiv.org/abs/2602.13390v1
Date: Fri, 13 Feb 2026 19:00:04 GMT
Title: Dynamical metastability and transient topological magnons in interacting driven-dissipative magnetic systems
Authors: Vincent P. Flynn, Lorenza Viola, Benedetta Flebus,
Abstract summary: We extend dynamical metastability into the nonlinear, interacting regime and identify magnetic heterostructures as a natural platform for its exploration.<n>Our results constitute the first systematic study of dynamical metastability in nonlinear dynamics.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Metastability, i.e., partial relaxation to long-lived, quasi-stationary states before true asymptotic equilibrium sets in, emerges ubiquitously in classical and quantum dynamical systems as a result of timescales separation. In open quantum systems, an intrinsically nonequilibrium analogue, dynamical metastability, can originate from the spectral geometry of a non-Hermitian operator. In noninteracting models, this mechanism produces boundary-sensitive anomalous relaxation, transient amplification, and topologically mandated long-lived edge modes, all of which are enhanced as system size grows. Here we extend dynamical metastability into the nonlinear, interacting regime and identify magnetic heterostructures as a natural platform for its exploration. We introduce an interacting spin Lindbladian whose linearized magnon dynamics map onto a dynamically metastable Hatano-Nelson chain, and show that dynamical metastability in the noninteracting limit seeds genuinely nonlinear phenomena, including size-dependent spin dipping and anomalous attraction to unstable equilibria. Long-lived edge states associated to topologically mandated Dirac bosons persist under nonlinearities and disorder. We further analyze the magnetization dynamics in magnetic multilayers within the classical Landau-Lifshitz-Gilbert-Slonczewski framework, identifying Dzyaloshinskii-Moriya interaction, nonlocal damping, and spin-transfer torque as control parameters governing bulk-boundary stability mismatch and band topology. While all the distinctive dynamical phenomena previously identified reappear in this experimentally relevant setting, the LLGS framework also supports multistability and limit cycles that are absent in the quantum model. Our results constitute the first systematic study of dynamical metastability in nonlinear dynamics, directly relevant to spin-torque oscillator arrays, magnonic devices, and beyond.

Related papers

KoopGen: Koopman Generator Networks for Representing and Predicting Dynamical Systems with Continuous Spectra [65.11254608352982]
We introduce a generator-based neural Koopman framework that models dynamics through a structured, state-dependent representation of Koopman generators.<n>By exploiting the intrinsic Cartesian decomposition into skew-adjoint and self-adjoint components, KoopGen separates conservative transport from irreversible dissipation.
arXiv Detail & Related papers (2026-02-15T06:32:23Z)
Observation of Magnetic Devil's Staircase-Like Behavior in Quasiperiodic Qubit Lattices [55.2480439325792]
devil's staircase (DS) phenomenon is a fractal response of magnetization to external fields.<n>We uncover a wealth of abrupt magnetic transitions driven by increasing external magnetic fields within a simple yet effective Ising-model framework.<n>Our results challenge the prevailing view that DS behavior is limited to periodic systems.
arXiv Detail & Related papers (2025-07-24T21:39:06Z)
Magnon Nesting in Driven Two-Dimensional Quantum Magnets [0.0]
We find a new class of dynamical quantum instability in driven magnets.<n>This instability leads to emergent enhancement of antiferromagnetic correlations even for purely ferromagnetic microscopic couplings.<n>In sharp contrast to the fermionic case, however, the magnon-driven instability is intrinsically non-equilibrium and fundamentally inaccessible in thermal physics.
arXiv Detail & Related papers (2025-05-15T17:41:44Z)
Generative System Dynamics in Recurrent Neural Networks [56.958984970518564]
We investigate the continuous time dynamics of Recurrent Neural Networks (RNNs)<n>We show that skew-symmetric weight matrices are fundamental to enable stable limit cycles in both linear and nonlinear configurations.<n> Numerical simulations showcase how nonlinear activation functions not only maintain limit cycles, but also enhance the numerical stability of the system integration process.
arXiv Detail & Related papers (2025-04-16T10:39:43Z)
Topology of Monitored Quantum Dynamics [5.388986285256996]
We classify Kraus operators and their effective non-Hermitian dynamical generators.<n>Our classification elucidates the role of topology in measurement-induced phase transitions.<n>We establish the bulk-boundary correspondence in monitored quantum dynamics.
arXiv Detail & Related papers (2024-12-09T01:27:26Z)
The Interplay of Finite and Infinite Size Stability in Quadratic Bosonic Lindbladians [0.0]
We show that two distinct flavors of dynamical metastability can arise. Type I QBLs are dynamically unstable in the infinite-size limit, yet stable once open boundaries are imposed. Type II QBLs are dynamically stable for infinite size, but become unstable under open boundary conditions for arbitrary finite system size.
arXiv Detail & Related papers (2024-05-14T18:00:03Z)
Emerging topological characterization in non-equilibrium states of quenched Kitaev chains [0.0]
Topological characteristics of quantum systems are determined by the closing of a gap. The dynamical quantum phase transition (DQPT) during quantum real-time evolution has emerged as a nonequilibrium analog to the quantum phase transition (QPT)
arXiv Detail & Related papers (2023-11-14T10:26:15Z)
Non-equilibrium quantum probing through linear response [41.94295877935867]
We study the system's response to unitary perturbations, as well as non-unitary perturbations, affecting the properties of the environment. We show that linear response, combined with a quantum probing approach, can effectively provide valuable quantitative information about the perturbation and characteristics of the environment.
arXiv Detail & Related papers (2023-06-14T13:31:23Z)
Slow semiclassical dynamics of a two-dimensional Hubbard model in disorder-free potentials [77.34726150561087]
We show that introduction of harmonic and spin-dependent linear potentials sufficiently validates fTWA for longer times. In particular, we focus on a finite two-dimensional system and show that at intermediate linear potential strength, the addition of a harmonic potential and spin dependence of the tilt, results in subdiffusive dynamics.
arXiv Detail & Related papers (2022-10-03T16:51:25Z)
Dynamics with autoregressive neural quantum states: application to critical quench dynamics [41.94295877935867]
We present an alternative general scheme that enables one to capture long-time dynamics of quantum systems in a stable fashion. We apply the scheme to time-dependent quench dynamics by investigating the Kibble-Zurek mechanism in the two-dimensional quantum Ising model.
arXiv Detail & Related papers (2022-09-07T15:50:00Z)
Probing dynamics of a two-dimensional dipolar spin ensemble using single qubit sensor [62.997667081978825]
We experimentally investigate individual spin dynamics in a two-dimensional ensemble of electron spins on the surface of a diamond crystal. We show that this anomalously slow relaxation rate is due to the presence of strong dynamical disorder. Our work paves the way towards microscopic study and control of quantum thermalization in strongly interacting disordered spin ensembles.
arXiv Detail & Related papers (2022-07-21T18:00:17Z)
Stability and quasi-Periodicity of Many-Body Localized Dynamics [0.0]
Many-Body Localization (MBL) is a phenomenon where interacting particles in disordered chains fail to thermalize.<n>In this paper, we identify MBL through quasi-periodic dynamics in the entanglement evolution of subsystems in a disordered Heisenberg chain.<n>Our results prove that in regimes of sufficiently strong disorder, the entanglement evolution of individual subsystems remains quasi-periodic in the thermodynamic limit.
arXiv Detail & Related papers (2022-01-26T22:50:04Z)

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