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Solving parametric PDE problems with artificial neural networks

YUEHAW KHOO, JIANFENG LU, LEXING YING

2020European Journal of Applied Mathematics182 citationsDOIOpen Access PDF

Abstract

The curse of dimensionality is commonly encountered in numerical partial differential equations (PDE), especially when uncertainties have to be modelled into the equations as random coefficients. However, very often the variability of physical quantities derived from PDE can be captured by a few features on the space of the coefficient fields. Based on such observation, we propose using neural network to parameterise the physical quantity of interest as a function of input coefficients. The representability of such quantity using a neural network can be justified by viewing the neural network as performing time evolution to find the solutions to the PDE. We further demonstrate the simplicity and accuracy of the approach through notable examples of PDEs in engineering and physics.

Topics & Concepts

Curse of dimensionalityArtificial neural networkComputer scienceParametric statisticsPartial differential equationApplied mathematicsMathematical optimizationFunction (biology)Stochastic neural networkParametric equationAlgorithmSimplicityPhysical systemArtificial intelligenceDimensionality reductionSpace (punctuation)MathematicsDimension (graph theory)Feature (linguistics)Function spaceCurrent (fluid)Differential equationNumerical analysisUncertainty quantificationFunction approximationPartial derivativeModel Reduction and Neural NetworksProbabilistic and Robust Engineering DesignNumerical methods for differential equations