In this paper we propose a Deep Learning architecture to approximate diffeomorphisms diffeotopic to the identity. We consider a control system of the form $\dot x = \sum_{i=1}^lF_i(x)u_i$, with linear dependence in the controls, and we use the corresponding flow to approximate the action of a diffeomorphism on a compact ensemble of points. Despite the simplicity of the control system, it has been recently shown that a Universal Approximation Property holds. The problem of minimizing the sum of the training error and of a regularizing term induces a gradient flow in the space of admissible controls. A possible training procedure for the discrete-time neural network consists in projecting the gradient flow onto a finite-dimensional subspace o...
In recent years, deep learning has been connected with optimal control as a way to define a notion o...
A deep learning approach for the approximation of the Hamilton-Jacobi-Bellman partial differential e...
We develop a new formulation of deep learning based on the Mori-Zwanzig (MZ) formalism of irreversib...
This paper considers the problem of controlling a dynamical system when the state cannot be directly...
We consider recent work of Haber and Ruthotto 2017 and Chang et al. 2018, where deep learning neural...
Recent research reveals that deep learning is an effective way of solving high dimensional Hamilton-...
In this paper, we address the adversarial training of neural ODEs from a robust control perspective....
One of the fundamental problems in shape analysis is to align curves or surfaces before computing ge...
We briefly review recent work where deep learning neural networks have been interpreted as discretis...
We consider recent work of Haber and Ruthotto 2017 and Chang et al. 2018, where deep learning neural...
We consider recent work of Haber and Ruthotto 2017 and Chang et al. 2018, where deep learning neural...
Optimal control problems naturally arise in many scientific applications where one wishes to steer a...
We present a novel deep learning approach to approximate the solution of large, sparse, symmetric, p...
International audienceThis paper addresses the understanding and characterization of residual networ...
The paper contains approximation guarantees for neural networks that are trained with gradient flow,...
In recent years, deep learning has been connected with optimal control as a way to define a notion o...
A deep learning approach for the approximation of the Hamilton-Jacobi-Bellman partial differential e...
We develop a new formulation of deep learning based on the Mori-Zwanzig (MZ) formalism of irreversib...
This paper considers the problem of controlling a dynamical system when the state cannot be directly...
We consider recent work of Haber and Ruthotto 2017 and Chang et al. 2018, where deep learning neural...
Recent research reveals that deep learning is an effective way of solving high dimensional Hamilton-...
In this paper, we address the adversarial training of neural ODEs from a robust control perspective....
One of the fundamental problems in shape analysis is to align curves or surfaces before computing ge...
We briefly review recent work where deep learning neural networks have been interpreted as discretis...
We consider recent work of Haber and Ruthotto 2017 and Chang et al. 2018, where deep learning neural...
We consider recent work of Haber and Ruthotto 2017 and Chang et al. 2018, where deep learning neural...
Optimal control problems naturally arise in many scientific applications where one wishes to steer a...
We present a novel deep learning approach to approximate the solution of large, sparse, symmetric, p...
International audienceThis paper addresses the understanding and characterization of residual networ...
The paper contains approximation guarantees for neural networks that are trained with gradient flow,...
In recent years, deep learning has been connected with optimal control as a way to define a notion o...
A deep learning approach for the approximation of the Hamilton-Jacobi-Bellman partial differential e...
We develop a new formulation of deep learning based on the Mori-Zwanzig (MZ) formalism of irreversib...