Related papers: Predicting Dynamics of Transmon Qubit-Cavity Systems with Recurrent Neural Networks

Predicting Dynamics of Transmon Qubit-Cavity Systems with Recurrent Neural Networks

URL: http://arxiv.org/abs/2109.14471v1
Date: Wed, 29 Sep 2021 15:02:23 GMT
Title: Predicting Dynamics of Transmon Qubit-Cavity Systems with Recurrent Neural Networks
Authors: Nima Leclerc
Abstract summary: Current models based on solutions to master equations are not sufficient in capturing the non-Markovian dynamics at play. We present a method of overcoming this by using a recurrent neural network to obtain effective solutions to the Lindblad master equation for a coupled transmon qubit-cavity system.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Developing accurate and computationally inexpensive models for the dynamics of open-quantum systems is critical in designing new qubit platforms by first understanding their mechanisms of decoherence and dephasing. Current models based on solutions to master equations are not sufficient in capturing the non-Markovian dynamics at play and suffer from large computational costs. Here, we present a method of overcoming this by using a recurrent neural network to obtain effective solutions to the Lindblad master equation for a coupled transmon qubit-cavity system. We present the training and testing performance of the model trained a simulated dataset and demonstrate its ability to map microscopic dissipative mechanisms to quantum observables.

Related papers

Mechanistic Neural Networks for Scientific Machine Learning [58.99592521721158]
We present Mechanistic Neural Networks, a neural network design for machine learning applications in the sciences. It incorporates a new Mechanistic Block in standard architectures to explicitly learn governing differential equations as representations. Central to our approach is a novel Relaxed Linear Programming solver (NeuRLP) inspired by a technique that reduces solving linear ODEs to solving linear programs.
arXiv Detail & Related papers (2024-02-20T15:23:24Z)
Capturing dynamical correlations using implicit neural representations [85.66456606776552]
We develop an artificial intelligence framework which combines a neural network trained to mimic simulated data from a model Hamiltonian with automatic differentiation to recover unknown parameters from experimental data. In doing so, we illustrate the ability to build and train a differentiable model only once, which then can be applied in real-time to multi-dimensional scattering data.
arXiv Detail & Related papers (2023-04-08T07:55:36Z)
An Adversarial Active Sampling-based Data Augmentation Framework for Manufacturable Chip Design [55.62660894625669]
Lithography modeling is a crucial problem in chip design to ensure a chip design mask is manufacturable. Recent developments in machine learning have provided alternative solutions in replacing the time-consuming lithography simulations with deep neural networks. We propose a litho-aware data augmentation framework to resolve the dilemma of limited data and improve the machine learning model performance.
arXiv Detail & Related papers (2022-10-27T20:53:39Z)
An advanced spatio-temporal convolutional recurrent neural network for storm surge predictions [73.4962254843935]
We study the capability of artificial neural network models to emulate storm surge based on the storm track/size/intensity history. This study presents a neural network model that can predict storm surge, informed by a database of synthetic storm simulations.
arXiv Detail & Related papers (2022-04-18T23:42:18Z)
Learning Trajectories of Hamiltonian Systems with Neural Networks [81.38804205212425]
We propose to enhance Hamiltonian neural networks with an estimation of a continuous-time trajectory of the modeled system. We demonstrate that the proposed integration scheme works well for HNNs, especially with low sampling rates, noisy and irregular observations.
arXiv Detail & Related papers (2022-04-11T13:25:45Z)
Neural net modeling of equilibria in NSTX-U [0.0]
We develop two neural networks relevant to equilibrium and shape control modeling. Networks include Eqnet, a free-boundary equilibrium solver trained on the EFIT01 reconstruction algorithm, and Pertnet, which is trained on the Gspert code. We report strong performance for both networks indicating that these models could reliably be used within closed-loop simulations.
arXiv Detail & Related papers (2022-02-28T16:09:58Z)
Learning Stochastic Dynamics with Statistics-Informed Neural Network [0.4297070083645049]
We introduce a machine-learning framework named statistics-informed neural network (SINN) for learning dynamics from data. We devise mechanisms for training the neural network model to reproduce the correct emphstatistical behavior of a target process. We show that the obtained reduced-order model can be trained on temporally coarse-grained data and hence is well suited for rare-event simulations.
arXiv Detail & Related papers (2022-02-24T18:21:01Z)
EINNs: Epidemiologically-Informed Neural Networks [75.34199997857341]
We introduce a new class of physics-informed neural networks-EINN-crafted for epidemic forecasting. We investigate how to leverage both the theoretical flexibility provided by mechanistic models as well as the data-driven expressability afforded by AI models.
arXiv Detail & Related papers (2022-02-21T18:59:03Z)
Constrained Block Nonlinear Neural Dynamical Models [1.3163098563588727]
Neural network modules conditioned by known priors can be effectively trained and combined to represent systems with nonlinear dynamics. The proposed method consists of neural network blocks that represent input, state, and output dynamics with constraints placed on the network weights and system variables. We evaluate the performance of the proposed architecture and training methods on system identification tasks for three nonlinear systems.
arXiv Detail & Related papers (2021-01-06T04:27:54Z)
Sobolev training of thermodynamic-informed neural networks for smoothed elasto-plasticity models with level set hardening [0.0]
We introduce a deep learning framework designed to train smoothed elastoplasticity models with interpretable components. By recasting the yield function as an evolving level set, we introduce a machine learning approach to predict the solutions of the Hamilton-Jacobi equation.
arXiv Detail & Related papers (2020-10-15T22:43:32Z)
Learning Queuing Networks by Recurrent Neural Networks [0.0]
We propose a machine-learning approach to derive performance models from data. We exploit a deterministic approximation of their average dynamics in terms of a compact system of ordinary differential equations. This allows for an interpretable structure of the neural network, which can be trained from system measurements to yield a white-box parameterized model.
arXiv Detail & Related papers (2020-02-25T10:56:47Z)

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