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Innovative Approaches to the Numerical Approximation of PDEs

This workshop was about the numerical solution of PDEs for which classical approaches, such as the finite element method, are not well suited or need further (theoretical) underpinnings. A prominent example of PDEs for which classical methods are not well suited are PDEs posed in high space dimensions. New results on low rank tensor approximation for those problems were presented. Other presentations dealt with regularity of PDEs, the numerical solution of PDEs on surfaces, PDEs of fractional order, numerical solvers for PDEs that converge with exponential rates, and the application of deep neural networks for solving PDEs.

European Mathematical Society - EMS - Publishing House GmbH

Stephan Dahlke Gitta Kutyniok Ricardo H. Nochetto Rob Stevenson

Oberwolfach Reports

2020

Title: Innovative Approaches to the Numerical Approximation of PDEs

Description:

This workshop was about the numerical solution of PDEs for which classical approaches, such as the finite element method, are not well suited or need further (theoretical) underpinnings.

A prominent example of PDEs for which classical methods are not well suited are PDEs posed in high space dimensions.

New results on low rank tensor approximation for those problems were presented.

Other presentations dealt with regularity of PDEs, the numerical solution of PDEs on surfaces, PDEs of fractional order, numerical solvers for PDEs that converge with exponential rates, and the application of deep neural networks for solving PDEs.

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Innovative Approaches to the Numerical Approximation of PDEs

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