Related papers: Markovian Embeddings of Non-Markovian Quantum Systems: Coupled Stochastic and Quantum Master Equations for Non-Markovian Quantum Systems

Markovian Embeddings of Non-Markovian Quantum Systems: Coupled Stochastic and Quantum Master Equations for Non-Markovian Quantum Systems

URL: http://arxiv.org/abs/2312.00134v2
Date: Thu, 1 Feb 2024 12:06:06 GMT
Title: Markovian Embeddings of Non-Markovian Quantum Systems: Coupled Stochastic and Quantum Master Equations for Non-Markovian Quantum Systems
Authors: Hendra I. Nurdin
Abstract summary: This work considers non-Markovian principal quantum systems that can be embedded in a larger Markovian quantum system. The results are expected to be of interest for (open-loop and feedback) control of continuous-time non-Markovian systems.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Quantum Markov models are employed ubiquitously in quantum physics and in quantum information theory due to their relative simplicity and analytical tractability. In particular, these models are known to give accurate approximations for a wide range of quantum optical and mesoscopic systems. However, in general, the validity of the Markov approximation entails assumptions regarding properties of the system of interest and its environment, which may not be satisfied or accurate in arbitrary physical systems. Therefore, developing useful modelling tools for general non-Markovian quantum systems for which the Markov approximation is inappropriate or deficient is an undertaking of significant importance. This work considers non-Markovian principal quantum systems that can be embedded in a larger Markovian quantum system with one or more compound baths consisting of an auxiliary quantum system and a quantum white noise field, and derives a set of coupled stochastic and quantum master equations for embedded non-Markovian quantum systems. The case of a purely Hamiltonian coupling between the principal and auxiliary systems as a closed system without coupling to white noises is included as a special case. The results are expected to be of interest for (open-loop and feedback) control of continuous-time non-Markovian systems and studying reduced models for numerical simulation of such systems. They may also shed more light on the general structure of continuous-time non-Markovian quantum systems.

Related papers

Effect of the readout efficiency of quantum measurement on the system entanglement [44.99833362998488]
We quantify the entanglement for a particle on a 1d quantum random walk under inefficient monitoring. We find that the system's maximal mean entanglement at the measurement-induced quantum-to-classical crossover is in different ways by the measurement strength and inefficiency.
arXiv Detail & Related papers (2024-02-29T18:10:05Z)
Long-term behaviour in an exactly solvable model of pure decoherence and the problem of Markovian embedding [0.0]
We consider a well-known exactly solvable model of an open quantum system with pure decoherence. It is worthwhile to study how the long-term rate of decoherence depends on the spectral density characterizing the system-bath interaction.
arXiv Detail & Related papers (2023-11-27T17:09:27Z)
Semi-device-independent certification of quantum non-Markovianity using sequential Random Access Codes [0.3262230127283452]
We investigate multi-time processes using the process matrix formalism. We show that the presence of a quantum non-Markovian environment plays a significant role in enhancing the communication capacity.
arXiv Detail & Related papers (2023-09-28T06:21:24Z)
Theory of Quantum Generative Learning Models with Maximum Mean Discrepancy [67.02951777522547]
We study learnability of quantum circuit Born machines (QCBMs) and quantum generative adversarial networks (QGANs) We first analyze the generalization ability of QCBMs and identify their superiorities when the quantum devices can directly access the target distribution. Next, we prove how the generalization error bound of QGANs depends on the employed Ansatz, the number of qudits, and input states.
arXiv Detail & Related papers (2022-05-10T08:05:59Z)
Succinct Description and Efficient Simulation of Non-Markovian Open Quantum Systems [1.713291434132985]
Non-Markovian open quantum systems represent the most general dynamics when the quantum system is coupled with a bath environment. We provide a succinct representation of the dynamics of non-Markovian open quantum systems with quantifiable error. We also develop an efficient quantum algorithm for simulating such dynamics.
arXiv Detail & Related papers (2021-11-05T03:35:50Z)
Efficient criteria of quantumness for a large system of qubits [58.720142291102135]
We discuss the dimensionless combinations of basic parameters of large, partially quantum coherent systems. Based on analytical and numerical calculations, we suggest one such number for a system of qubits undergoing adiabatic evolution.
arXiv Detail & Related papers (2021-08-30T23:50:05Z)
Convergence guarantees for discrete mode approximations to non-Markovian quantum baths [0.7734726150561088]
Non-Markovian effects are important in modeling the behavior of open quantum systems in solid-state physics, quantum optics, and in study of biological and chemical systems. We show that under some physically motivated assumptions on the system-environment interaction, the finite-time dynamics of the non-Markovian open quantum system computed with a sufficiently large number of modes guaranteed to converge is an approximation. Our results lend rigor to classical and quantum algorithms for approximating non-Markovian dynamics.
arXiv Detail & Related papers (2021-07-15T08:52:38Z)
Preserving quantum correlations and coherence with non-Markovianity [50.591267188664666]
We demonstrate the usefulness of non-Markovianity for preserving correlations and coherence in quantum systems. For covariant qubit evolutions, we show that non-Markovianity can be used to preserve quantum coherence at all times.
arXiv Detail & Related papers (2021-06-25T11:52:51Z)
Preparing random states and benchmarking with many-body quantum chaos [48.044162981804526]
We show how to predict and experimentally observe the emergence of random state ensembles naturally under time-independent Hamiltonian dynamics. The observed random ensembles emerge from projective measurements and are intimately linked to universal correlations built up between subsystems of a larger quantum system. Our work has implications for understanding randomness in quantum dynamics, and enables applications of this concept in a wider context.
arXiv Detail & Related papers (2021-03-05T08:32:43Z)
Quantum Non-equilibrium Many-Body Spin-Photon Systems [91.3755431537592]
dissertation concerns the quantum dynamics of strongly-correlated quantum systems in out-of-equilibrium states. Our main results can be summarized in three parts: Signature of Critical Dynamics, Driven Dicke Model as a Test-bed of Ultra-Strong Coupling, and Beyond the Kibble-Zurek Mechanism.
arXiv Detail & Related papers (2020-07-23T19:05:56Z)
Universal non-Markovianity Detection in Hybrid Open Quantum Systems [0.0]
A universal characterization of non-Markovianity for any open hybrid quantum systems is presented. It is shown, that the proposed measure can be utilized for any single or multi-partite quantum system.
arXiv Detail & Related papers (2020-07-04T03:39:26Z)

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