Multiscale modeling is an effective approach for investigating multiphysics systems with largely disparate size features, where models with different resolutions or heterogeneous descriptions are coupled together for predicting the system's response. The solver with lower fidelity (coarse) is responsible for simulating domains with homogeneous features, whereas the expensive high-fidelity (fine) model describes microscopic features with refined discretization, often making the overall cost prohibitively high, especially for time-dependent problems. In this work, we explore the idea of multiscale modeling with machine learning and employ DeepONet, a neural operator, as an efficient surrogate of the expensive solver. DeepONet is trained offli...
Motivated by the successes in the field of deep learning, the scientific community has been increasi...
Multiscale computational modelling is challenging due to the high computational cost of direct numer...
Multiscale modeling approaches have attracted a lot of attention in the past decade due to the compu...
The application of multiscale methods that are based on computational homogenization, such as the we...
In this paper, we propose a deep-learning-based approach to a class of multiscale problems. The gene...
In many applications arising from geosciences, one needs to solve problems with multiple scales. For...
Direct numerical simulation of hierarchical materials via homogenization-based concurrent multiscale...
Many engineering problems have multiscale features. These problems usually require some model reduct...
peer reviewedArtificial Neural Networks (NNWs) are appealing functions to substitute high dimensiona...
International audienceSolving large structural problems with multiple complex localized behaviors po...
The data-driven discovery of partial differential equations (PDEs) consistent with spatiotemporal da...
In mechanics and engineering, the Finite Element Method (FEM) represents the predominant numerical s...
Physics simulation computationally models physical phenomena. It is the bread-and-butter of modern-d...
In multiscale modeling of subsurface fluid flow in heterogeneous porous media, standard polynomial b...
The data-driven discovery of partial differential equations (PDEs) consistent with spatiotemporal da...
Motivated by the successes in the field of deep learning, the scientific community has been increasi...
Multiscale computational modelling is challenging due to the high computational cost of direct numer...
Multiscale modeling approaches have attracted a lot of attention in the past decade due to the compu...
The application of multiscale methods that are based on computational homogenization, such as the we...
In this paper, we propose a deep-learning-based approach to a class of multiscale problems. The gene...
In many applications arising from geosciences, one needs to solve problems with multiple scales. For...
Direct numerical simulation of hierarchical materials via homogenization-based concurrent multiscale...
Many engineering problems have multiscale features. These problems usually require some model reduct...
peer reviewedArtificial Neural Networks (NNWs) are appealing functions to substitute high dimensiona...
International audienceSolving large structural problems with multiple complex localized behaviors po...
The data-driven discovery of partial differential equations (PDEs) consistent with spatiotemporal da...
In mechanics and engineering, the Finite Element Method (FEM) represents the predominant numerical s...
Physics simulation computationally models physical phenomena. It is the bread-and-butter of modern-d...
In multiscale modeling of subsurface fluid flow in heterogeneous porous media, standard polynomial b...
The data-driven discovery of partial differential equations (PDEs) consistent with spatiotemporal da...
Motivated by the successes in the field of deep learning, the scientific community has been increasi...
Multiscale computational modelling is challenging due to the high computational cost of direct numer...
Multiscale modeling approaches have attracted a lot of attention in the past decade due to the compu...