A Nonlinear Hyperbolic Model for Radiative Transfer Equation in Slab Geometry
Linear models for the radiative transfer equation have been well developed, while nonlinear models are seldom investigated even for slab geometry due to some essential difficulties. We have proposed a moment model in MPN for slab geometry which combines the ideas of the classical PN and MN model. Though the model is far from perfect, it was demonstrated to be quite efficient in numerically approximating the solution of the radiative transfer equation, that we are motivated to further improve this model. Consequently we propose in this paper a new model following the chartmap in MPN with some significant theoretic progresses. The new model is derived with global hyperbolicity, and meanwhile some necessary physical properties are preserved. We give a complete analysis to the characteristic structure and propose a numerical scheme for the new model. Numerical examples are presented to demonstrate the numerical performance of the new model.
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