The structure of well-balanced schemes for Friedrichs systems with linear relaxation
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摘要
We study the conservative structure of linear Friedrichs systems with linear relaxation in view of the definition of well-balanced schemes. We introduce a particular global change of basis and show that the change-of-basis matrix can be used to develop a systematic treatment of well-balanced schemes in one dimension. This algebra sheds new light on a family of schemes proposed recently by Gosse (2011). The application to the Sn model (a paradigm for the approximation of kinetic equations) for radiation is detailed. The discussion of the singular case is performed, and the 2D extension is shown to be equal to a specific multidimensional scheme proposed in Buet et al. (2012). This work is dedicated to the 2014 celebration of C.D. Munz’ scientific accomplishments in the development of numerical methods for various problems in fluid mechanics.
论文关键词:Well balanced schemes,Friedrichs systems,Conservative formulation,Finite volume schemes,65J10,65N06,65N99
论文评审过程:Received 7 November 2014, Revised 27 February 2015, Accepted 21 April 2015, Available online 13 May 2015, Version of Record 10 November 2015.
论文官网地址:https://doi.org/10.1016/j.amc.2015.04.085