Related papers: Entanglement structure for finite system under dual-unitary dynamics

Entanglement structure for finite system under dual-unitary dynamics

URL: http://arxiv.org/abs/2506.09904v1
Date: Wed, 11 Jun 2025 16:17:17 GMT
Title: Entanglement structure for finite system under dual-unitary dynamics
Authors: Gaurav Rudra Malik, Rohit Kumar Shukla, Sudhanva Joshi, S. Aravinda, Sunil Kumar Mishra,
Abstract summary: We show how individual two-body operators influence the global dynamics of circuits composed of dual-unitaries.<n>We also highlight the significant role of local unitaries in the dynamics when paired with operators from the dual-unitary class.<n>We find that time-evolving an initial state composed of pair products generates a state with nearly maximal multipartite entanglement content.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: The dynamics of quantum many-body systems in the chaotic regime are of particular interest due to the associated phenomena of information scrambling and entanglement generation within the system. While these systems are typically intractable using traditional numerical methods, an effective framework can be implemented based on dual-unitary circuits which have emerged as a minimal model for maximally chaotic dynamics. In this work, we investigate how individual two-body operators influence the global dynamics of circuits composed of dual-unitaries. We study their effect on entanglement generation while examining it from both bipartite and multipartite perspectives. Here we also highlight the significant role of local unitaries in the dynamics when paired with operators from the dual-unitary class, showing that systems with identical entangling power can exhibit a range of differing entanglement growth rates. Furthermore, we present calculations establishing time-step-dependent lower bounds, which depend on both the initial state and the entangling power of the constituent operators. Finally, we find that time-evolving an initial state composed of pair products generates a state with nearly maximal multipartite entanglement content, approaching the bounds established by Absolutely Maximally Entangled (AME) states.

Related papers

Excitation-Pulse Intensity Mediated Coherent Control in V-Type Systems [0.0]
V-type three-level systems serve as fundamental models for exploring coherent light-matter interactions in a range of quantum systems.<n>We demonstrate that the coherent evolution of a three-level system critically depends on the product of the excitation-pulse duration and energy separation between the excited states.<n>We show that by varying the pulse areas of the excitation pulses, one can selectively turn individual spectral features on or off, corresponding to distinct quantum pathways.
arXiv Detail & Related papers (2025-06-16T11:24:41Z)
Time-dependent Neural Galerkin Method for Quantum Dynamics [42.81677042059531]
We introduce a classical computational method for quantum dynamics that relies on a global-in-time variational principle.<n>Our scheme computes the entire state trajectory over a finite time window by minimizing a loss function that enforces the Schr"odinger's equation.<n>We showcase the method by simulating global quantum quenches in the paradigmatic Transverse-Field Ising model in both 1D and 2D.
arXiv Detail & Related papers (2024-12-16T13:48:54Z)
Visualizing Dynamics of Charges and Strings in (2+1)D Lattice Gauge Theories [103.95523007319937]
Lattice gauge theories (LGTs) can be employed to understand a wide range of phenomena.<n>Here, we investigate the dynamics of local excitations in a $mathZ$ LGT using a two-dimensional lattice of superconducting qubits.<n>Our method allows us to experimentally image string dynamics in a (2+1)D LGT from which we uncover two distinct regimes.
arXiv Detail & Related papers (2024-09-25T17:59:05Z)
Topological, multi-mode amplification induced by non-reciprocal, long-range dissipative couplings [41.94295877935867]
We show the emergence of unconventional, non-reciprocal, long-range dissipative couplings induced by the interaction of the bosonic chain with a chiral, multimode channel.<n>We also show how these couplings can also display topological amplifying phases that are dynamically stable in the presence of local parametric drivings.
arXiv Detail & Related papers (2024-05-16T15:16:33Z)
Solvable entanglement dynamics in quantum circuits with generalized space-time duality [0.0]
We study the non-equilibrium dynamics of kicked Ising models in $1+1$ dimensions.<n>We find rich phenomenology ranging from linear growth at half the maximal speed allowed by locality to entanglement growth with saturation to extensive but sub-maximal entropy.
arXiv Detail & Related papers (2023-12-19T15:23:55Z)
Statistical and dynamical aspects of quantum chaos in a kicked Bose-Hubbard dimer [7.737485570054659]
We study a kicked two-site Bose-Hubbard model (Bose-Hubbard dimer) with the on-site potential difference being periodically modulated. By analyzing spectral statistics of Floquet operator, we unveil that the system undergoes a transition from regularity to chaos with increasing the interaction strength. The semiclassical analysis also suggests that the system in chaotic regime may display different dynamical behavior depending on the choice of initial states.
arXiv Detail & Related papers (2023-12-13T14:10:54Z)
Structured quantum collision models: generating coherence with thermal resources [0.0]
In this work we represent each ancillary system as a structured system. We show how this scenario modifies the kind of master equation that one can obtain for the evolution of the open systems. Thanks to the simplicity of the collision model, this allows us to better understand the thermodynamic cost of creating coherence in a system.
arXiv Detail & Related papers (2023-07-14T16:43:46Z)
Growth of entanglement of generic states under dual-unitary dynamics [77.34726150561087]
Dual-unitary circuits are a class of locally-interacting quantum many-body systems. In particular, they admit a class of solvable" initial states for which, in the thermodynamic limit, one can access the full non-equilibrium dynamics. We show that in this case the entanglement increment during a time step is sub-maximal for finite times, however, it approaches the maximal value in the infinite-time limit.
arXiv Detail & Related papers (2022-07-29T18:20:09Z)
Genuine Multipartite Correlations in a Boundary Time Crystal [56.967919268256786]
We study genuine multipartite correlations (GMC's) in a boundary time crystal (BTC) We analyze both (i) the structure (orders) of GMC's among the subsystems, as well as (ii) their build-up dynamics for an initially uncorrelated state.
arXiv Detail & Related papers (2021-12-21T20:25:02Z)
Enhancement of quantum correlations and geometric phase for a driven bipartite quantum system in a structured environment [77.34726150561087]
We study the role of driving in an initial maximally entangled state evolving under a structured environment. This knowledge can aid the search for physical setups that best retain quantum properties under dissipative dynamics.
arXiv Detail & Related papers (2021-03-18T21:11:37Z)
Self-consistent theory of mobility edges in quasiperiodic chains [62.997667081978825]
We introduce a self-consistent theory of mobility edges in nearest-neighbour tight-binding chains with quasiperiodic potentials. mobility edges are generic in quasiperiodic systems which lack the energy-independent self-duality of the commonly studied Aubry-Andr'e-Harper model.
arXiv Detail & Related papers (2020-12-02T19:00:09Z)
Learning Continuous System Dynamics from Irregularly-Sampled Partial Observations [33.63818978256567]
We present LG-ODE, a latent ordinary differential equation generative model for modeling multi-agent dynamic system with known graph structure. It can simultaneously learn the embedding of high dimensional trajectories and infer continuous latent system dynamics. Our model employs a novel encoder parameterized by a graph neural network that can infer initial states in an unsupervised way.
arXiv Detail & Related papers (2020-11-08T01:02:22Z)
Relevant OTOC operators: footprints of the classical dynamics [68.8204255655161]
The OTOC-RE theorem relates the OTOCs summed over a complete base of operators to the second Renyi entropy. We show that the sum over a small set of relevant operators, is enough in order to obtain a very good approximation for the entropy. In turn, this provides with an alternative natural indicator of complexity, i.e. the scaling of the number of relevant operators with time.
arXiv Detail & Related papers (2020-07-31T19:23:26Z)

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