We survey the mathematical foundations of geometric deep learning, focusing on group equivariant and gauge equivariant neural networks. We develop gauge equivariant convolutional neural networks on arbitrary manifolds M using principal bundles with structure group K and equivariant maps between sections of associated vector bundles. We also discuss group equivariant neural networks for homogeneous spaces M= G/ K , which are instead equivariant with respect to the global symmetry G on M . Group equivariant layers can be interpreted as intertwiners between induced representations of G, and we show their relation to gauge equivariant convolutional layers. We analyze several applications of this formalism, including semantic segmentation and ob...
This repository allows one to reproduce the results in Towards a topological-geometrical theory of g...
In recent years the use of convolutional layers to encode an inductive bias (translational equivaria...
Funder: Cantab Capital Institute for the Mathematics of InformationFunder: Alan Turing Institute; do...
We survey the mathematical foundations of geometric deep learning, focusing on group equivariant and...
Deep neural networks can solve many kinds of learning problems, but only if a lot of data is availab...
We present a general theory of Group equivariant Convolutional Neural Networks (G-CNNs) on homogeneo...
Over the past decade, deep learning has revolutionized industry and academic research. Neural networ...
The principle of equivariance to symmetry transformations enables a theoretically grounded approach ...
G-equivariant convolutional neural networks (GCNNs) is a geometric deep learning model for data defi...
We present a PDE-based framework that generalizes Group equivariant Convolutional Neural Networks (G...
The introduction of relevant physical information into neural network architectures has become a wid...
The incorporation of prior knowledge into the ma-chine learning pipeline is subject of informed mach...
This paper is concerned with a fundamental problem in geometric deep learning that arises in the con...
Deep learning has achieved a remarkable performance breakthrough in several fields, most notably in ...
The goal of these course notes is to describe the main mathematical ideas behind geometric deep lear...
This repository allows one to reproduce the results in Towards a topological-geometrical theory of g...
In recent years the use of convolutional layers to encode an inductive bias (translational equivaria...
Funder: Cantab Capital Institute for the Mathematics of InformationFunder: Alan Turing Institute; do...
We survey the mathematical foundations of geometric deep learning, focusing on group equivariant and...
Deep neural networks can solve many kinds of learning problems, but only if a lot of data is availab...
We present a general theory of Group equivariant Convolutional Neural Networks (G-CNNs) on homogeneo...
Over the past decade, deep learning has revolutionized industry and academic research. Neural networ...
The principle of equivariance to symmetry transformations enables a theoretically grounded approach ...
G-equivariant convolutional neural networks (GCNNs) is a geometric deep learning model for data defi...
We present a PDE-based framework that generalizes Group equivariant Convolutional Neural Networks (G...
The introduction of relevant physical information into neural network architectures has become a wid...
The incorporation of prior knowledge into the ma-chine learning pipeline is subject of informed mach...
This paper is concerned with a fundamental problem in geometric deep learning that arises in the con...
Deep learning has achieved a remarkable performance breakthrough in several fields, most notably in ...
The goal of these course notes is to describe the main mathematical ideas behind geometric deep lear...
This repository allows one to reproduce the results in Towards a topological-geometrical theory of g...
In recent years the use of convolutional layers to encode an inductive bias (translational equivaria...
Funder: Cantab Capital Institute for the Mathematics of InformationFunder: Alan Turing Institute; do...