Related papers: Application of Neural Ordinary Differential Equations for Tokamak Plasma Dynamics Analysis

Application of Neural Ordinary Differential Equations for Tokamak Plasma Dynamics Analysis

URL: http://arxiv.org/abs/2403.01635v1
Date: Sun, 3 Mar 2024 22:55:39 GMT
Title: Application of Neural Ordinary Differential Equations for Tokamak Plasma Dynamics Analysis
Authors: Zefang Liu, Weston M. Stacey
Abstract summary: This study introduces a multi-region multi-timescale transport model, employing Neural Ordinary Differential Equations (Neural ODEs) Our methodology leverages Neural ODEs for the numerical derivation of diffusivity parameters from DIII-D tokamak experimental data. These regions are conceptualized as distinct nodes, capturing the critical timescales of radiation and transport processes essential for efficient tokamak operation.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: In the quest for controlled thermonuclear fusion, tokamaks present complex challenges in understanding burning plasma dynamics. This study introduces a multi-region multi-timescale transport model, employing Neural Ordinary Differential Equations (Neural ODEs) to simulate the intricate energy transfer processes within tokamaks. Our methodology leverages Neural ODEs for the numerical derivation of diffusivity parameters from DIII-D tokamak experimental data, enabling the precise modeling of energy interactions between electrons and ions across various regions, including the core, edge, and scrape-off layer. These regions are conceptualized as distinct nodes, capturing the critical timescales of radiation and transport processes essential for efficient tokamak operation. Validation against DIII-D plasmas under various auxiliary heating conditions demonstrates the model's effectiveness, ultimately shedding light on ways to enhance tokamak performance with deep learning.

Related papers

Neural Message Passing Induced by Energy-Constrained Diffusion [79.9193447649011]
We propose an energy-constrained diffusion model as a principled interpretable framework for understanding the mechanism of MPNNs. We show that the new model can yield promising performance for cases where the data structures are observed (as a graph), partially observed or completely unobserved.
arXiv Detail & Related papers (2024-09-13T17:54:41Z)
Application of Neural Ordinary Differential Equations for ITER Burning Plasma Dynamics [0.0]
The dynamics of burning plasmas in tokamaks are crucial for advancing controlled thermonuclear fusion. This study introduces the NeuralPlasmaODE to simulate the complex energy transfer processes in ITER deuterium-tritium (D-T) plasmas.
arXiv Detail & Related papers (2024-08-26T16:47:20Z)
NeuralODEs for VLEO simulations: Introducing thermoNET for Thermosphere Modeling [4.868863044142366]
thermoNET represents thermospheric density in satellite orbital propagation using a reduced amount of differentiable computations. Network parameters are learned based on observed dynamics, adapting through ODE sensitivities.
arXiv Detail & Related papers (2024-05-29T09:12:44Z)
Deep generative modelling of canonical ensemble with differentiable thermal properties [0.9421843976231371]
We propose a variational modelling method with differentiable temperature for canonical ensembles. Using a deep generative model, the free energy is estimated and minimized simultaneously in a continuous temperature range. The training process requires no dataset, and works with arbitrary explicit density generative models.
arXiv Detail & Related papers (2024-04-29T03:41:49Z)
FTL: Transfer Learning Nonlinear Plasma Dynamic Transitions in Low Dimensional Embeddings via Deep Neural Networks [0.66679021407228]
Deep learning algorithms provide a new paradigm to study high-dimensional dynamical behaviors, such as those in fusion plasma systems. Development of novel model reduction methods, coupled with detection of abnormal modes with plasma physics, opens a unique opportunity for building efficient models. Our Fusion Transfer Learning model demonstrates success in reconstructing nonlinear kink mode structures.
arXiv Detail & Related papers (2024-04-26T15:08:57Z)
Towards Detailed Text-to-Motion Synthesis via Basic-to-Advanced Hierarchical Diffusion Model [60.27825196999742]
We propose a novel Basic-to-Advanced Hierarchical Diffusion Model, named B2A-HDM, to collaboratively exploit low-dimensional and high-dimensional diffusion models for detailed motion synthesis. Specifically, the basic diffusion model in low-dimensional latent space provides the intermediate denoising result that is consistent with the textual description. The advanced diffusion model in high-dimensional latent space focuses on the following detail-enhancing denoising process.
arXiv Detail & Related papers (2023-12-18T06:30:39Z)
Modiff: Action-Conditioned 3D Motion Generation with Denoising Diffusion Probabilistic Models [58.357180353368896]
We propose a conditional paradigm that benefits from the denoising diffusion probabilistic model (DDPM) to tackle the problem of realistic and diverse action-conditioned 3D skeleton-based motion generation. We are a pioneering attempt that uses DDPM to synthesize a variable number of motion sequences conditioned on a categorical action.
arXiv Detail & Related papers (2023-01-10T13:15:42Z)
Unsupervised Discovery of Inertial-Fusion Plasma Physics using Differentiable Kinetic Simulations and a Maximum Entropy Loss Function [77.34726150561087]
We create a differentiable solver for the plasma kinetics 3D partial-differential-equation and introduce a domain-specific objective function. We apply this framework to an inertial-fusion relevant configuration and find that the optimization process exploits a novel physical effect.
arXiv Detail & Related papers (2022-06-03T15:27:33Z)
Equivariant Diffusion for Molecule Generation in 3D [74.289191525633]
This work introduces a diffusion model for molecule computation generation in 3D that is equivariant to Euclidean transformations. Experimentally, the proposed method significantly outperforms previous 3D molecular generative methods regarding the quality of generated samples and efficiency at training time.
arXiv Detail & Related papers (2022-03-31T12:52:25Z)
Mixed Effects Neural ODE: A Variational Approximation for Analyzing the Dynamics of Panel Data [50.23363975709122]
We propose a probabilistic model called ME-NODE to incorporate (fixed + random) mixed effects for analyzing panel data. We show that our model can be derived using smooth approximations of SDEs provided by the Wong-Zakai theorem. We then derive Evidence Based Lower Bounds for ME-NODE, and develop (efficient) training algorithms.
arXiv Detail & Related papers (2022-02-18T22:41:51Z)

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