An overview on machine learning methods for partial differential equations: from physics informed neural networks to deep operator learning.arXiv:2408.13222, page 59 pages, 2024

Lukas Gonon, Arnulf Jentzen, Benno Kuckuck, Siyu Liang, Adrian Riekert, Philippe von Wurstemberger · 2024 · arXiv 2408.13222

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Random Neural Network Expressivity for Non-Linear Partial Differential Equations

math.NA · 2026-05-24 · unverdicted · novelty 5.0

Random neural networks achieve a dimension-free approximation rate of 1/2 for sufficiently regular time-dependent Sobolev functions and can efficiently approximate solutions to Porous Medium Equations and Compressible Navier-Stokes Equations.

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Random Neural Network Expressivity for Non-Linear Partial Differential Equations math.NA · 2026-05-24 · unverdicted · none · ref 32
Random neural networks achieve a dimension-free approximation rate of 1/2 for sufficiently regular time-dependent Sobolev functions and can efficiently approximate solutions to Porous Medium Equations and Compressible Navier-Stokes Equations.

An overview on machine learning methods for partial differential equations: from physics informed neural networks to deep operator learning.arXiv:2408.13222, page 59 pages, 2024

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