This paper introduces MDP homomorphic networks for deep reinforcement learning. MDP homomorphic networks are neural networks that are equivariant under symmetries in the joint state-action space of an MDP. Current approaches to deep reinforcement learning do not usually exploit knowledge about such structure. By building this prior knowledge into policy and value networks using an equivariance constraint, we can reduce the size of the solution space. We specifically focus on group-structured symmetries (invertible transformations). Additionally, we introduce an easy method for constructing equivariant network layers numerically, so the system designer need not solve the constraints by hand, as is typically done. We construct MDP homomorphic...
Treating neural network inputs and outputs as random variables, we characterize the structure of neu...
In recent years the use of convolutional layers to encode an inductive bias (translational equivaria...
Incorporating symmetries can lead to highly data-efficient and generalizable models by defining equi...
One of the central tools developed by M. Minsky and S. Papert (1988) was the group invariance theore...
In this thesis we describe two separate works: higher order permutation equivariant layers for neura...
This work exploits action equivariance for representation learning in reinforcement learning. Equiva...
We survey the mathematical foundations of geometric deep learning, focusing on group equivariant and...
In this paper, we propose the use of data symmetries, in the sense of equivalences under signal tran...
Deep neural networks can solve many kinds of learning problems, but only if a lot of data is availab...
We present a PDE-based framework that generalizes Group equivariant Convolutional Neural Networks (G...
This paper investigates the effects of introducing symmetries into feedforward neural networks in wh...
In recent years the use of convolutional layers to encode an inductive bias (translational equivaria...
Animals are able to rapidly infer from limited experience when sets of state action pairs have equiv...
International audienceSymmetry is present in many tasks in computer vision, where the same class of ...
This thesis is about adaptive invariance, and a new model of it: the Group Representation Network. W...
Treating neural network inputs and outputs as random variables, we characterize the structure of neu...
In recent years the use of convolutional layers to encode an inductive bias (translational equivaria...
Incorporating symmetries can lead to highly data-efficient and generalizable models by defining equi...
One of the central tools developed by M. Minsky and S. Papert (1988) was the group invariance theore...
In this thesis we describe two separate works: higher order permutation equivariant layers for neura...
This work exploits action equivariance for representation learning in reinforcement learning. Equiva...
We survey the mathematical foundations of geometric deep learning, focusing on group equivariant and...
In this paper, we propose the use of data symmetries, in the sense of equivalences under signal tran...
Deep neural networks can solve many kinds of learning problems, but only if a lot of data is availab...
We present a PDE-based framework that generalizes Group equivariant Convolutional Neural Networks (G...
This paper investigates the effects of introducing symmetries into feedforward neural networks in wh...
In recent years the use of convolutional layers to encode an inductive bias (translational equivaria...
Animals are able to rapidly infer from limited experience when sets of state action pairs have equiv...
International audienceSymmetry is present in many tasks in computer vision, where the same class of ...
This thesis is about adaptive invariance, and a new model of it: the Group Representation Network. W...
Treating neural network inputs and outputs as random variables, we characterize the structure of neu...
In recent years the use of convolutional layers to encode an inductive bias (translational equivaria...
Incorporating symmetries can lead to highly data-efficient and generalizable models by defining equi...