This work focuses on the numerical solution of hyperbolic conservations laws (possibly endowed with a source term) using the Active Flux method. This method is an extension of the finite volume method. Instead of solving a Riemann Problem, the Active Flux method uses actively evolved point values along the cell boundary in order to compute the numerical flux. Early applications of the method were linear equations with an available exact solution operator, and Active Flux was shown to be structure preserving in such cases. For nonlinear PDEs or balance laws, exact evolution operators generally are unavailable. Here, strategies are shown how sufficiently accurate approximate evolution operators can be designed which allow to make Active Flux structure preserving / well-balanced for nonlinear problems.
翻译:这项工作侧重于使用“主动流动”法的双曲保护法(可能具有源术语)的数字解决方案。该方法是有限体积法的延伸。“主动通量法”不是解决里曼问题,而是在细胞边界沿线使用积极进化的点值来计算数字通量。该方法的早期应用是具有可用精确解算操作器的线性方程式,而“主动通量”在这类情况下被证明是结构的保存。对于非线性PDEs或平衡法,则一般没有精确的演进操作器。在这里,所显示的战略是能够设计出足够准确的近似演化操作器,从而使得“主动通量结构”保持/平衡非线性问题。
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