A deep branching solver for fully nonlinear partial differential equations
We present a multidimensional deep learning implementation of a stochastic branching algorithm for the numerical solution of fully nonlinear PDEs. This approach is designed to tackle functional nonlinearities involving gradient terms of any orders, by combining the use of neural networks with a Mont...
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sg-ntu-dr.10356-1780692024-06-04T05:04:54Z A deep branching solver for fully nonlinear partial differential equations Nguwi, Jiang Yu Penent, Guillaume Privault, Nicolas School of Physical and Mathematical Sciences Mathematical Sciences Deep neural network Deep Galerkin We present a multidimensional deep learning implementation of a stochastic branching algorithm for the numerical solution of fully nonlinear PDEs. This approach is designed to tackle functional nonlinearities involving gradient terms of any orders, by combining the use of neural networks with a Monte Carlo branching algorithm. In comparison with other deep learning PDE solvers, it also allows us to check the consistency of the learned neural network function. Numerical experiments presented show that this algorithm can outperform deep learning approaches based on backward stochastic differential equations or the Galerkin method, and provide solution estimates that are not obtained by those methods in fully nonlinear examples. Ministry of Education (MOE) This research is supported by the Ministry of Education, Singapore, under its Tier 2 Grant MOE-T2EP20120-0005. 2024-06-04T05:04:54Z 2024-06-04T05:04:54Z 2024 Journal Article Nguwi, J. Y., Penent, G. & Privault, N. (2024). A deep branching solver for fully nonlinear partial differential equations. Journal of Computational Physics, 499, 112712-. https://dx.doi.org/10.1016/j.jcp.2023.112712 0021-9991 https://hdl.handle.net/10356/178069 10.1016/j.jcp.2023.112712 2-s2.0-85180742364 499 112712 en MOE-T2EP20120-0005 Journal of Computational Physics © 2023 Elsevier Inc. All rights reserved. |
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Mathematical Sciences Deep neural network Deep Galerkin |
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Mathematical Sciences Deep neural network Deep Galerkin Nguwi, Jiang Yu Penent, Guillaume Privault, Nicolas A deep branching solver for fully nonlinear partial differential equations |
| description |
We present a multidimensional deep learning implementation of a stochastic branching algorithm for the numerical solution of fully nonlinear PDEs. This approach is designed to tackle functional nonlinearities involving gradient terms of any orders, by combining the use of neural networks with a Monte Carlo branching algorithm. In comparison with other deep learning PDE solvers, it also allows us to check the consistency of the learned neural network function. Numerical experiments presented show that this algorithm can outperform deep learning approaches based on backward stochastic differential equations or the Galerkin method, and provide solution estimates that are not obtained by those methods in fully nonlinear examples. |
| author2 |
School of Physical and Mathematical Sciences |
| author_facet |
School of Physical and Mathematical Sciences Nguwi, Jiang Yu Penent, Guillaume Privault, Nicolas |
| format |
Article |
| author |
Nguwi, Jiang Yu Penent, Guillaume Privault, Nicolas |
| author_sort |
Nguwi, Jiang Yu |
| title |
A deep branching solver for fully nonlinear partial differential equations |
| title_short |
A deep branching solver for fully nonlinear partial differential equations |
| title_full |
A deep branching solver for fully nonlinear partial differential equations |
| title_fullStr |
A deep branching solver for fully nonlinear partial differential equations |
| title_full_unstemmed |
A deep branching solver for fully nonlinear partial differential equations |
| title_sort |
deep branching solver for fully nonlinear partial differential equations |
| publishDate |
2024 |
| url |
https://hdl.handle.net/10356/178069 |
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1806059811861692416 |