Natural model reduction for kinetic equations

A promising approach to investigating high-dimensional problems is to identify their intrinsically low-dimensional features, which can be achieved through recently developed techniques for effective low-dimensional representation of functions such as machine learning. Based on available finite-dimen...

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Veröffentlicht in:	Research in the mathematical sciences 2024-09, Vol.11 (3), Article 53
Hauptverfasser:	Jin, Zeyu, Li, Ruo
Format:	Artikel
Sprache:	eng
Schlagworte:	Applications of Mathematics Computational Mathematics and Numerical Analysis Conservation laws Hyperbolic systems Kinetic equations Kinetic theory Machine learning Mathematics Mathematics and Statistics Model reduction Stability
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description	A promising approach to investigating high-dimensional problems is to identify their intrinsically low-dimensional features, which can be achieved through recently developed techniques for effective low-dimensional representation of functions such as machine learning. Based on available finite-dimensional approximate solution manifolds, this paper proposes a novel model reduction framework for kinetic equations. The method employs projections onto tangent bundles of approximate manifolds, naturally resulting in first-order hyperbolic systems. Under certain conditions on the approximate manifolds, the reduced models preserve several crucial properties, including hyperbolicity, conservation laws, entropy dissipation, finite propagation speed, and linear stability. For the first time, this paper rigorously discusses the relation between the H-theorem of kinetic equations and the linear stability conditions of reduced systems, determining the choice of Riemannian metrics involved in the model reduction. The framework is widely applicable for the model reduction of many models in kinetic theory.
doi_str_mv	10.1007/s40687-024-00466-7
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subjects	Applications of Mathematics Computational Mathematics and Numerical Analysis Conservation laws Hyperbolic systems Kinetic equations Kinetic theory Machine learning Mathematics Mathematics and Statistics Model reduction Stability
title	Natural model reduction for kinetic equations
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