Related papers: Entanglement dynamics of coupled oscillators from Gaussian states

Entanglement dynamics of coupled oscillators from Gaussian states

URL: http://arxiv.org/abs/2104.12332v1
Date: Mon, 26 Apr 2021 03:37:09 GMT
Title: Entanglement dynamics of coupled oscillators from Gaussian states
Authors: Cemal Dinc, Onur Oktay
Abstract summary: We explore the dynamics of entanglement of an isolated quantum system consisting of two time-dependent, coupled harmonic oscillators. We use a numerical method that relies on the estimation of the system's Wigner representation by a specific Gaussian function. Also, we analyze how the entropy of entanglement change as a function of time.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: In this work, we explore the dynamics of entanglement of an isolated quantum system consisting of two time-dependent, coupled harmonic oscillators. Through the use of a numerical method that relies on the estimation of the system's Wigner representation by a specific Gaussian function, we investigate the time evolution of the entanglement entropy after an instant quench in the inherent parameters of the system. Besides, from the comparison of the results obtained from the analytical expression for the time-dependent von Neumann entropy with the numerically computed entropy data, the effectiveness of the numerical method is tested for a variety of angular frequency combinations. Also, we analyze how the entropy of entanglement change as a function of time.

Related papers

Quantum Simulation of Nonlinear Dynamical Systems Using Repeated Measurement [42.896772730859645]
We present a quantum algorithm based on repeated measurement to solve initial-value problems for nonlinear ordinary differential equations. We apply this approach to the classic logistic and Lorenz systems in both integrable and chaotic regimes.
arXiv Detail & Related papers (2024-10-04T18:06:12Z)
Efficiency of Dynamical Decoupling for (Almost) Any Spin-Boson Model [44.99833362998488]
We analytically study the dynamical decoupling of a two-level system coupled with a structured bosonic environment. We find sufficient conditions under which dynamical decoupling works for such systems. Our bounds reproduce the correct scaling in various relevant system parameters.
arXiv Detail & Related papers (2024-09-24T04:58:28Z)
On the validity of the rotating wave approximation for coupled harmonic oscillators [34.82692226532414]
We solve the dynamics analytically by employing tools from symplectic geometry. We find that the squeezing present in the full Hamiltonian and in the initial state governs the deviation from the approximated evolution. We also show that the rotating wave approximation is recovered for resonant frequencies and vanishing coupling to frequency ratio.
arXiv Detail & Related papers (2024-03-22T16:51:53Z)
Ab-initio variational wave functions for the time-dependent many-electron Schrödinger equation [41.94295877935867]
We introduce a variational approach for fermionic time-dependent wave functions, surpassing mean-field approximations. We use time-dependent Jastrow factors and backflow transformations, which are enhanced through neural networks parameterizations. The results showcase the ability of our variational approach to accurately capture the time evolution, providing insight into the quantum dynamics of interacting electronic systems.
arXiv Detail & Related papers (2024-03-12T09:37:22Z)
Unbiasing time-dependent Variational Monte Carlo by projected quantum evolution [44.99833362998488]
We analyze the accuracy and sample complexity of variational Monte Carlo approaches to simulate quantum systems classically. We prove that the most used scheme, the time-dependent Variational Monte Carlo (tVMC), is affected by a systematic statistical bias. We show that a different scheme based on the solution of an optimization problem at each time step is free from such problems.
arXiv Detail & Related papers (2023-05-23T17:38:10Z)
Towards Entanglement Entropy of Random Large-N Theories [0.0]
We use the replica approach and the notion of shifted Matsubara frequency to compute von Neumann and R'enyi entanglement entropies. We demonstrate the flexibility of the method by applying it to examples of a two-site problem in presence of decoherence.
arXiv Detail & Related papers (2023-03-03T18:21:54Z)
Page curves and typical entanglement in linear optics [0.0]
We study entanglement within a set of squeezed modes that have been evolved by a random linear optical unitary. We prove various results on the typicality of entanglement as measured by the R'enyi-2 entropy. Our main make use of a symmetry property obeyed by the average and the variance of the entropy that dramatically simplifies the averaging over unitaries.
arXiv Detail & Related papers (2022-09-14T18:00:03Z)
Entanglement in interacting quenched two-body coupled oscillator system [0.653972432012203]
We use the invariant operator method, under a perturbative framework, for computing the ground state of this system. We show the analytical calculation of two entanglement measures viz., Von Neumann entanglement entropy using replica trick and Renyi entanglement entropy. We comment on the variation of these entanglement measures for different orders of coupling strength.
arXiv Detail & Related papers (2022-04-11T18:00:03Z)
Dynamics of entropy and information of time-dependent quantum systems: exact results [0.0]
Dynamical aspects of information-theoretic and entropic measures of quantum systems are studied. We show that for the time-dependent harmonic oscillator, as well as for the charged particle in certain time-varying electromagnetic fields, the increase of the entropy and dynamics of the Fisher information can be directly described and related. We detail the behavior of quantum quenches for the case of mutually non-interacting non-relativistic fermions in a harmonic trap.
arXiv Detail & Related papers (2021-08-02T15:22:32Z)
The Connection between Discrete- and Continuous-Time Descriptions of Gaussian Continuous Processes [60.35125735474386]
We show that discretizations yielding consistent estimators have the property of invariance under coarse-graining' This result explains why combining differencing schemes for derivatives reconstruction and local-in-time inference approaches does not work for time series analysis of second or higher order differential equations.
arXiv Detail & Related papers (2021-01-16T17:11:02Z)
Time dependent propagator for an-harmonic oscillator with quartic term in potential [0.0]
We find the differential equation for the variable, determining the behavior of the harmonic. We present the an-harmonic part of the result in the form of the operator function.
arXiv Detail & Related papers (2020-03-27T10:49:15Z)

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