具有不连续势的Liouville方程的保持哈密顿间断Galerkin方法

Boyang Ye, Shi Jin, Y. Xing, Xinghui Zhong
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引用次数: 0

摘要

. 对经典力学中具有不连续势的Liouville方程进行数值求解,往往会遇到如何保持势垒上的哈密顿量和cfl5条件下严格的时间步长约束的挑战。在Jin和Wen[19]的保持哈密顿有限体积格式的启发下,本文引入了具有不连续势的Liouville方程的保持哈密顿- 6间断Galerkin (DG)格式。DG - 7方法可以设计成任意精度级,具有易于自适应、模板紧凑和处理复杂边界条件和界面的能力等优点。我们建议仔细设计DG方法的数值通量,以将经典粒子在势垒处的行为建立到数值格式中,从而确保哈密顿量在势垒处的连续性和正确的透射和反射条件。在使用保正极限器的情况下,证明了方案11在L 1范数上是正稳定的。数值算例说明了所提数值格式的准确性和有效性。13 .结果显示HPDG的2D2V试验不连续
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Hamiltonian-Preserving Discontinuous Galerkin Methods for the Liouville Equation With Discontinuous Potential
. Numerically solving the Liouville equation in classical mechanics with a discontinuous potential often leads to the 4 challenges of how to preserve the Hamiltonian across the potential barrier and a severe time step constraint according to the CFL 5 condition. Motivated by the Hamiltonian-preserving finite volume schemes by Jin and Wen [19], we introduce a Hamiltonian- 6 preserving discontinuous Galerkin (DG) scheme for the Liouville equation with discontinuous potential in this paper. The DG 7 method can be designed with arbitrary order of accuracy, and offers many advantages including easy adaptivity, compact stencils 8 and the ability of handling complicated boundary condition and interfaces. We propose to carefully design the numerical fluxes 9 of the DG methods to build the behavior of a classical particle at the potential barrier into the numerical scheme, which ensures 10 the continuity of the Hamiltonian across the potential barrier and the correct transmission and reflection condition. Our scheme 11 is proved to be positive and stable in L 1 norm if the positivity-preserving limiter is applied. Numerical examples are provided to 12 illustrate the accuracy and effectiveness of the proposed numerical scheme. 13 results show 2D2V test discontinuity of HPDG
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