Related papers: NeuralODEs for VLEO simulations: Introducing thermoNET for Thermosphere Modeling

NeuralODEs for VLEO simulations: Introducing thermoNET for Thermosphere Modeling

URL: http://arxiv.org/abs/2405.19384v1
Date: Wed, 29 May 2024 09:12:44 GMT
Title: NeuralODEs for VLEO simulations: Introducing thermoNET for Thermosphere Modeling
Authors: Dario Izzo, Giacomo Acciarini, Francesco Biscani,
Abstract summary: 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.
Score: 4.868863044142366
License: http://creativecommons.org/licenses/by/4.0/
Abstract: We introduce a novel neural architecture termed thermoNET, designed to represent thermospheric density in satellite orbital propagation using a reduced amount of differentiable computations. Due to the appearance of a neural network on the right-hand side of the equations of motion, the resulting satellite dynamics is governed by a NeuralODE, a neural Ordinary Differential Equation, characterized by its fully differentiable nature, allowing the derivation of variational equations (hence of the state transition matrix) and facilitating its use in connection to advanced numerical techniques such as Taylor-based numerical propagation and differential algebraic techniques. Efficient training of the network parameters occurs through two distinct approaches. In the first approach, the network undergoes training independently of spacecraft dynamics, engaging in a pure regression task against ground truth models, including JB-08 and NRLMSISE-00. In the second paradigm, network parameters are learned based on observed dynamics, adapting through ODE sensitivities. In both cases, the outcome is a flexible, compact model of the thermosphere density greatly enhancing numerical propagation efficiency while maintaining accuracy in the orbital predictions.

Related papers

Parametric Taylor series based latent dynamics identification neural networks [0.3139093405260182]
A new latent identification of nonlinear dynamics, P-TLDINets, is introduced. It relies on a novel neural network structure based on Taylor series expansion and ResNets.
arXiv Detail & Related papers (2024-10-05T15:10:32Z)
Latent Space Energy-based Neural ODEs [73.01344439786524]
This paper introduces a novel family of deep dynamical models designed to represent continuous-time sequence data. We train the model using maximum likelihood estimation with Markov chain Monte Carlo. Experiments on oscillating systems, videos and real-world state sequences (MuJoCo) illustrate that ODEs with the learnable energy-based prior outperform existing counterparts.
arXiv Detail & Related papers (2024-09-05T18:14:22Z)
Enhancing lattice kinetic schemes for fluid dynamics with Lattice-Equivariant Neural Networks [79.16635054977068]
We present a new class of equivariant neural networks, dubbed Lattice-Equivariant Neural Networks (LENNs) Our approach develops within a recently introduced framework aimed at learning neural network-based surrogate models Lattice Boltzmann collision operators. Our work opens towards practical utilization of machine learning-augmented Lattice Boltzmann CFD in real-world simulations.
arXiv Detail & Related papers (2024-05-22T17:23:15Z)
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)
Neural Operator with Regularity Structure for Modeling Dynamics Driven by SPDEs [70.51212431290611]
Partial differential equations (SPDEs) are significant tools for modeling dynamics in many areas including atmospheric sciences and physics. We propose the Neural Operator with Regularity Structure (NORS) which incorporates the feature vectors for modeling dynamics driven by SPDEs. We conduct experiments on various of SPDEs including the dynamic Phi41 model and the 2d Navier-Stokes equation.
arXiv Detail & Related papers (2022-04-13T08:53:41Z)
Climate Modeling with Neural Diffusion Equations [3.8521112392276]
We design a novel climate model based on the neural ordinary differential equation (NODE) and the diffusion equation. Our method consistently outperforms existing baselines by non-trivial margins.
arXiv Detail & Related papers (2021-11-11T01:48:46Z)
Physics informed machine learning with Smoothed Particle Hydrodynamics: Hierarchy of reduced Lagrangian models of turbulence [0.6542219246821327]
This manuscript develops a hierarchy of parameterized reduced Lagrangian models for turbulent flows. It investigates the effects of enforcing physical structure through Smoothed Particle Hydrodynamics (SPH) versus relying on neural networks (NN)s as universal function approximators.
arXiv Detail & Related papers (2021-10-25T22:57:40Z)
An Ode to an ODE [78.97367880223254]
We present a new paradigm for Neural ODE algorithms, called ODEtoODE, where time-dependent parameters of the main flow evolve according to a matrix flow on the group O(d) This nested system of two flows provides stability and effectiveness of training and provably solves the gradient vanishing-explosion problem.
arXiv Detail & Related papers (2020-06-19T22:05:19Z)
Liquid Time-constant Networks [117.57116214802504]
We introduce a new class of time-continuous recurrent neural network models. Instead of declaring a learning system's dynamics by implicit nonlinearities, we construct networks of linear first-order dynamical systems. These neural networks exhibit stable and bounded behavior, yield superior expressivity within the family of neural ordinary differential equations.
arXiv Detail & Related papers (2020-06-08T09:53:35Z)
Incorporating Symmetry into Deep Dynamics Models for Improved Generalization [24.363954435050264]
We propose to improve accuracy and generalization by incorporating symmetries into convolutional neural networks. Our models are theoretically and experimentally robust to distributional shift by symmetry group transformations. Compared with image or text applications, our work is a significant step towards applying equivariant neural networks to high-dimensional systems.
arXiv Detail & Related papers (2020-02-08T01:28:17Z)

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