Residual minimization is a widely used technique for solving Partial Differential Equations in variational form. It minimizes the dual norm of the residual, which naturally yields a saddle-point (min–max) problem over the so-called trial and test spaces. In the context of neural networks, we can address this min–max approach by employing one network to seek the trial minimum, while another network seeks the test maximizers. However, the resulting method is numerically unstable as we approach the trial solution. To overcome this, we reformulate the residual minimization as an equivalent minimization of a Ritz functional fed by optimal test functions computed from another Ritz functional minimization. We call the resulting scheme the Deep Dou...
Neural networks have been very successful in many applications; we often, however, lack a theoretica...
We perform a comprehensive numerical study of the effect of approximation-theoretical results for n...
Recent works have shown that deep neural networks can be employed to solve partial differential equa...
Residual minimization is a widely used technique for solving Partial Differential Equations in varia...
We analyze neural network solutions to partial differential equations obtained with Physics Informed...
We propose an abstract framework for analyzing the convergence of least-squares methods based on res...
In this paper, we present and compare four methods to enforce Dirichlet boundary conditions in Physi...
When using Neural Networks as trial functions to numerically solve PDEs, a key choice to be made is...
Deep learning-based numerical schemes such as Physically Informed Neural Networks (PINNs) have recen...
We introduce a Robust version of the Variational Physics-Informed Neural Networks (RVPINNs) to appro...
Differential equations are ubiquitous in many fields of study, yet not all equations, whether ordina...
Parametric surrogate models for partial differential equations (PDEs) are a necessary component for ...
Physics-informed neural networks (PINNs) leverage neural-networks to find the solutions of partial d...
Deep learning-based numerical schemes such as Physically Informed Neural Networks (PINNs) have recen...
DoctorThis dissertation is about the neural network solutions of partial differential equations (PDE...
Neural networks have been very successful in many applications; we often, however, lack a theoretica...
We perform a comprehensive numerical study of the effect of approximation-theoretical results for n...
Recent works have shown that deep neural networks can be employed to solve partial differential equa...
Residual minimization is a widely used technique for solving Partial Differential Equations in varia...
We analyze neural network solutions to partial differential equations obtained with Physics Informed...
We propose an abstract framework for analyzing the convergence of least-squares methods based on res...
In this paper, we present and compare four methods to enforce Dirichlet boundary conditions in Physi...
When using Neural Networks as trial functions to numerically solve PDEs, a key choice to be made is...
Deep learning-based numerical schemes such as Physically Informed Neural Networks (PINNs) have recen...
We introduce a Robust version of the Variational Physics-Informed Neural Networks (RVPINNs) to appro...
Differential equations are ubiquitous in many fields of study, yet not all equations, whether ordina...
Parametric surrogate models for partial differential equations (PDEs) are a necessary component for ...
Physics-informed neural networks (PINNs) leverage neural-networks to find the solutions of partial d...
Deep learning-based numerical schemes such as Physically Informed Neural Networks (PINNs) have recen...
DoctorThis dissertation is about the neural network solutions of partial differential equations (PDE...
Neural networks have been very successful in many applications; we often, however, lack a theoretica...
We perform a comprehensive numerical study of the effect of approximation-theoretical results for n...
Recent works have shown that deep neural networks can be employed to solve partial differential equa...