The Kolmogorov $n$-width of the solution manifolds of transport-dominated problems can decay slowly. As a result, it can be challenging to design efficient and accurate reduced order models (ROMs) for such problems. To address this issue, we propose a new learning-based projection method to construct nonlinear adaptive ROMs for transport problems. The construction follows the offline-online decomposition. In the offline stage, we train a neural network to construct adaptive reduced basis dependent on time and model parameters. In the online stage, we project the solution to the learned reduced manifold. Inheriting the merits from both deep learning and the projection method, the proposed method is more efficient than the conventional linear...
In this paper, we propose a network model, the multiclass classification-based reduced order model (...
To speed-up the solution of parametrized differential problems, reduced order models (ROMs) have bee...
Models with dominant advection always posed a difficult challenge for projection-based reduced order...
This thesis presents two nonlinear model reduction methods for systems of equations. One model utili...
Although projection-based reduced-order models (ROMs) for parameterized nonlinear dynamical systems ...
Although projection-based reduced-order models (ROMs) for parameterized nonlinear dynamical systems ...
Motivated by robust dynamic resource allocation in operations research, we study the \textit{Online ...
International audienceAbstract We propose a unified data-driven reduced order model (ROM) that bridg...
In this work we focus on reduced order modelling for problems for which the resulting reduced basis ...
Many applications in computational physics involve approximating problems with microstructure, chara...
Embedding nonlinear dynamical systems into artificial neural networks is a powerful new formalism fo...
A reduced basis method based on a physics-informed machine learning framework is developed for effic...
Reduced order models are computationally inexpensive approximations that capture the important dynam...
We present a new surrogate modeling technique for efficient approximation of input-output maps gover...
In analyzing and assessing the condition of dynamical systems, it is necessary to account for nonlin...
In this paper, we propose a network model, the multiclass classification-based reduced order model (...
To speed-up the solution of parametrized differential problems, reduced order models (ROMs) have bee...
Models with dominant advection always posed a difficult challenge for projection-based reduced order...
This thesis presents two nonlinear model reduction methods for systems of equations. One model utili...
Although projection-based reduced-order models (ROMs) for parameterized nonlinear dynamical systems ...
Although projection-based reduced-order models (ROMs) for parameterized nonlinear dynamical systems ...
Motivated by robust dynamic resource allocation in operations research, we study the \textit{Online ...
International audienceAbstract We propose a unified data-driven reduced order model (ROM) that bridg...
In this work we focus on reduced order modelling for problems for which the resulting reduced basis ...
Many applications in computational physics involve approximating problems with microstructure, chara...
Embedding nonlinear dynamical systems into artificial neural networks is a powerful new formalism fo...
A reduced basis method based on a physics-informed machine learning framework is developed for effic...
Reduced order models are computationally inexpensive approximations that capture the important dynam...
We present a new surrogate modeling technique for efficient approximation of input-output maps gover...
In analyzing and assessing the condition of dynamical systems, it is necessary to account for nonlin...
In this paper, we propose a network model, the multiclass classification-based reduced order model (...
To speed-up the solution of parametrized differential problems, reduced order models (ROMs) have bee...
Models with dominant advection always posed a difficult challenge for projection-based reduced order...