Machine learning methods have been lately used to solve partial differential equations (PDEs) and dynamical systems. These approaches have been developed into a novel research field known as scientific machine learning in which techniques such as deep neural networks and statistical learning are applied to classical problems of applied mathematics. In this paper, we develop a novel numerical algorithm that incorporates machine learning and artificial intelligence to solve PDEs. Based on the Legendre-Galerkin framework, we propose the {\it unsupervised machine learning} algorithm to learn {\it multiple instances} of the solutions for different types of PDEs. Our approach overcomes the limitations of data-driven and physics-based methods. The...
PDE discovery shows promise for uncovering predictive models of complex physical systems but has dif...
Recent works have shown that deep neural networks can be employed to solve partial differential equa...
It is one of the most challenging problems in applied mathematics to approximatively solve high-dime...
Solving analytically intractable partial differential equations (PDEs) that involve at least one var...
The physics informed neural network (PINN) is evolving as a viable method to solve partial different...
High-dimensional PDEs have been a longstanding computational challenge. We propose to solve high-dim...
Physics-informed neural networks (PINNs) leverage neural-networks to find the solutions of partial d...
Artificial intelligence (AI) shows great potential to reduce the huge cost of solving partial differ...
Unlike conventional grid and mesh based methods for solving partial differential equations (PDEs), n...
We introduce an approach for solving PDEs over manifolds using physics informed neural networks whos...
The approach of using physics-based machine learning to solve PDEs has recently become very popular....
DoctorThis dissertation is about the neural network solutions of partial differential equations (PDE...
he aim of this paper is to design neural network to present a method to solve Singular perturbation ...
In an attempt to find alternatives for solving partial differential equations (PDEs)with traditional...
Physics informed neural networks (PINNs) have emerged as a powerful tool to provide robust and accur...
PDE discovery shows promise for uncovering predictive models of complex physical systems but has dif...
Recent works have shown that deep neural networks can be employed to solve partial differential equa...
It is one of the most challenging problems in applied mathematics to approximatively solve high-dime...
Solving analytically intractable partial differential equations (PDEs) that involve at least one var...
The physics informed neural network (PINN) is evolving as a viable method to solve partial different...
High-dimensional PDEs have been a longstanding computational challenge. We propose to solve high-dim...
Physics-informed neural networks (PINNs) leverage neural-networks to find the solutions of partial d...
Artificial intelligence (AI) shows great potential to reduce the huge cost of solving partial differ...
Unlike conventional grid and mesh based methods for solving partial differential equations (PDEs), n...
We introduce an approach for solving PDEs over manifolds using physics informed neural networks whos...
The approach of using physics-based machine learning to solve PDEs has recently become very popular....
DoctorThis dissertation is about the neural network solutions of partial differential equations (PDE...
he aim of this paper is to design neural network to present a method to solve Singular perturbation ...
In an attempt to find alternatives for solving partial differential equations (PDEs)with traditional...
Physics informed neural networks (PINNs) have emerged as a powerful tool to provide robust and accur...
PDE discovery shows promise for uncovering predictive models of complex physical systems but has dif...
Recent works have shown that deep neural networks can be employed to solve partial differential equa...
It is one of the most challenging problems in applied mathematics to approximatively solve high-dime...