The classical development of neural networks has been primarily for mappings between a finite-dimensional Euclidean space and a set of classes, or between two finite-dimensional Euclidean spaces. The purpose of this work is to generalize neural networks so that they can learn mappings between infinite-dimensional spaces (operators). The key innovation in our work is that a single set of network parameters, within a carefully designed network architecture, may be used to describe mappings between infinite-dimensional spaces and between different finite-dimensional approximations of those spaces. We formulate approximation of the infinite-dimensional mapping by composing nonlinear activation functions and a class of integral operators. The ke...
In this paper, we propose physics-informed neural operators (PINO) that combine training data and ph...
We propose a novel deep learning (DL) approach to solve one-dimensional non-linear elliptic, parabol...
DoctorThis dissertation is about the neural network solutions of partial differential equations (PDE...
The classical development of neural networks has primarily focused on learning mappings between fini...
We investigate numerous structural connections between numerical algorithms for partial differential...
The classical development of neural networks has primarily focused on learning mappings between fini...
This paper introduces a novel two-stream deep model based on graph convolutional network (GCN) archi...
One of the main challenges in using deep learning-based methods for simulating physical systems and ...
Partial differential equations (PDEs) play a dominant role in the mathematical modeling of many comp...
Numerical methods for approximately solving partial differential equations (PDE) are at the core of ...
Recently deep learning surrogates and neural operators have shown promise in solving partial differe...
Neural operators have recently become popular tools for designing solution maps between function spa...
The approach of using physics-based machine learning to solve PDEs has recently become very popular....
In this thesis, we investigate the combination of Multigrid methods and Neural Networks, starting fr...
Lately, there has been a lot of research on using deep learning as an alternative method to solve PD...
In this paper, we propose physics-informed neural operators (PINO) that combine training data and ph...
We propose a novel deep learning (DL) approach to solve one-dimensional non-linear elliptic, parabol...
DoctorThis dissertation is about the neural network solutions of partial differential equations (PDE...
The classical development of neural networks has primarily focused on learning mappings between fini...
We investigate numerous structural connections between numerical algorithms for partial differential...
The classical development of neural networks has primarily focused on learning mappings between fini...
This paper introduces a novel two-stream deep model based on graph convolutional network (GCN) archi...
One of the main challenges in using deep learning-based methods for simulating physical systems and ...
Partial differential equations (PDEs) play a dominant role in the mathematical modeling of many comp...
Numerical methods for approximately solving partial differential equations (PDE) are at the core of ...
Recently deep learning surrogates and neural operators have shown promise in solving partial differe...
Neural operators have recently become popular tools for designing solution maps between function spa...
The approach of using physics-based machine learning to solve PDEs has recently become very popular....
In this thesis, we investigate the combination of Multigrid methods and Neural Networks, starting fr...
Lately, there has been a lot of research on using deep learning as an alternative method to solve PD...
In this paper, we propose physics-informed neural operators (PINO) that combine training data and ph...
We propose a novel deep learning (DL) approach to solve one-dimensional non-linear elliptic, parabol...
DoctorThis dissertation is about the neural network solutions of partial differential equations (PDE...