A Theoretical Analysis of Deep Neural Networks and Parametric PDEs
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https://hdl.handle.net/10037/23257Dato
2021-06-02Type
Journal articleTidsskriftartikkel
Peer reviewed
Sammendrag
We derive upper bounds on the complexity of ReLU neural networks approximating the solution maps of parametric partial differential equations. In particular, without any knowledge of its concrete shape, we use the inherent low dimensionality of the solution manifold to obtain approximation rates which are significantly superior to those provided by classical neural network approximation results. Concretely, we use the existence of a small reduced basis to construct, for a large variety of parametric partial differential equations, neural networks that yield approximations of the parametric solution maps in such a way that the sizes of these networks essentially only depend on the size of the reduced basis.
Forlag
SpringerSitering
Kutyniok, Petersen, Raslan, Schneider. A Theoretical Analysis of Deep Neural Networks and Parametric PDEs. Constructive approximation. 2021Metadata
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Copyright 2021 The Author(s)