Roe solver with entropy corrector for uncertain hyperbolic systems
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摘要
This paper deals with intrusive Galerkin projection methods with a Roe-type solver for treating uncertain hyperbolic systems using a finite volume discretization in physical space and a piecewise continuous representation at the stochastic level. The aim of this paper is to design a cost-effective adaptation of the deterministic Dubois and Mehlman corrector to avoid entropy-violating shocks in the presence of sonic points. The adaptation relies on an estimate of the eigenvalues and eigenvectors of the Galerkin Jacobian matrix of the deterministic system of the stochastic modes of the solution and on a correspondence between these approximate eigenvalues and eigenvectors for the intermediate states considered at the interface. We derive some indicators that can be used to decide where a correction is needed, thereby reducing the computational costs considerably. The effectiveness of the proposed corrector is assessed on the Burgers and Euler equations including sonic points.
论文关键词:Uncertainty quantification,Hyperbolic systems,Conservation laws,Stochastic spectral methods,Galerkin projection,Roe solver,Entropy correction
论文评审过程:Received 30 October 2009, Revised 26 March 2010, Available online 4 June 2010.
论文官网地址:https://doi.org/10.1016/j.cam.2010.05.043