Equivariant machine learning methods have shown wide success at 3D learning applications in recent years. These models explicitly build in the reflection, translation and rotation symmetries of Euclidean space and have facilitated large advances in accuracy and data efficiency for a range of applications in the physical sciences. An outstanding question for equivariant models is why they achieve such larger-than-expected advances in these applications. To probe this question, we examine the role of higher order (non-scalar) features in Euclidean Neural Networks (\texttt{e3nn}). We focus on the previously studied application of \texttt{e3nn} to the problem of electron density prediction, which allows for a variety of non-scalar outputs, and ...
In their review article (this issue) [1], Gorban, Makarov and Tyukin develop a successful effort to ...
This paper proposes a new point-cloud convolution structure that learns SE(3)-equivariant features. ...
Thesis (Ph.D.)--University of Washington, 2020Neural networks trained by machine learning optimizati...
We present e3nn, a generalized framework for creating E(3) equivariant trainable functions, also kno...
Equivariant Graph neural Networks (EGNs) are powerful in characterizing the dynamics of multi-body p...
Currently there exists rather promising new trend in machine leaning (ML) based on the relationship ...
Hyperbolic space can naturally embed hierarchies, unlike Euclidean space. Hyperbolic Neural Networks...
Solving geometric tasks involving point clouds by using machine learning is a challenging problem. S...
Group equivariance (e.g. SE(3) equivariance) is a critical physical symmetry in science, from classi...
The low dimensional manifold hypothesis posits that the data found in many applications, such as tho...
Rotation equivariance is a desirable property in many practical applications such as motion forecast...
Understanding how the statistical and geometric properties of neural activations relate to network p...
Despite the widely-spread consensus on the brain complexity, sprouts of the single neuron revolution...
Over the past decade, deep neural networks have proven to be adept in image classification tasks, of...
Slinky, a helical elastic rod, is a seemingly simple structure with unusual mechanical behavior; for...
In their review article (this issue) [1], Gorban, Makarov and Tyukin develop a successful effort to ...
This paper proposes a new point-cloud convolution structure that learns SE(3)-equivariant features. ...
Thesis (Ph.D.)--University of Washington, 2020Neural networks trained by machine learning optimizati...
We present e3nn, a generalized framework for creating E(3) equivariant trainable functions, also kno...
Equivariant Graph neural Networks (EGNs) are powerful in characterizing the dynamics of multi-body p...
Currently there exists rather promising new trend in machine leaning (ML) based on the relationship ...
Hyperbolic space can naturally embed hierarchies, unlike Euclidean space. Hyperbolic Neural Networks...
Solving geometric tasks involving point clouds by using machine learning is a challenging problem. S...
Group equivariance (e.g. SE(3) equivariance) is a critical physical symmetry in science, from classi...
The low dimensional manifold hypothesis posits that the data found in many applications, such as tho...
Rotation equivariance is a desirable property in many practical applications such as motion forecast...
Understanding how the statistical and geometric properties of neural activations relate to network p...
Despite the widely-spread consensus on the brain complexity, sprouts of the single neuron revolution...
Over the past decade, deep neural networks have proven to be adept in image classification tasks, of...
Slinky, a helical elastic rod, is a seemingly simple structure with unusual mechanical behavior; for...
In their review article (this issue) [1], Gorban, Makarov and Tyukin develop a successful effort to ...
This paper proposes a new point-cloud convolution structure that learns SE(3)-equivariant features. ...
Thesis (Ph.D.)--University of Washington, 2020Neural networks trained by machine learning optimizati...