A magic two-relaxation-time lattice Boltzmann algorithm for magnetohydrodynamics

IF 1.3 4区 数学 Q2 MATHEMATICS, APPLIED Discrete and Continuous Dynamical Systems-Series S Pub Date : 2023-01-01 DOI:10.3934/dcdss.2023157
P. Dellar
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引用次数: 1

Abstract

. The two-relaxation-time collision operator in discrete kinetic theory models collisions between particles by grouping them into pairs with anti-parallel velocities. It prescribes a linear relaxation towards equilibrium with one rate for the even combination of distribution functions for each pair, and another rate for the odd combination. We reformulate this collision operator using relaxation rates for the forward-propagating and backward-propagating combinations instead. An optimal pair of relaxation rates sets the forward-propagating combination of each pair of distributions to equilibrium. Only the backward-propagating non-equilibrium distributions remain. Applying this result twice gives closed discrete equations for evolving the macroscopic variables alone across three time levels. We split the equivalent equations into a first-order system: a conservation law and a kinetic equation for the flux. All other quantities are evaluated at equilibrium. We apply this formalism to the magnetic field in a lattice Boltzmann scheme for magnetohydrodynamics. The antisymmetric part of the kinetic equation matches the Maxwell–Faraday equation and Ohm’s law. The symmetric part matches the hyperbolic divergence cleaning model. The discrete divergence of the magnetic field remains zero, to within round-off error, when the initial magnetic field is the discrete curl of a vector potential. We have thus constructed a mimetic or constrained transport scheme for magnetohydrodynamics.
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磁流体力学的神奇双松弛时间晶格玻尔兹曼算法
. 离散运动理论中的双松弛时间碰撞算符通过将粒子分组成具有反平行速度的对来模拟粒子之间的碰撞。它规定了一种趋向平衡的线性松弛,对每对分布函数的偶组合有一个速率,对奇数组合有另一个速率。我们使用前向传播和后向传播组合的松弛率来重新表述这个碰撞算子。最优弛豫速率对使每对分布的前向传播组合达到平衡。只剩下反向传播的非平衡分布。应用这一结果两次,可以得到在三个时间水平上单独演化宏观变量的封闭离散方程。我们将等效方程分解为一阶系统:守恒定律和通量的动力学方程。所有其他的量都在平衡状态下求值。我们将这种形式应用于磁流体力学晶格玻尔兹曼格式的磁场。动力学方程的反对称部分符合麦克斯韦-法拉第方程和欧姆定律。对称部分符合双曲散度清理模型。当初始磁场是矢量势的离散旋度时,磁场的离散散度保持为零,在舍入误差范围内。因此,我们为磁流体力学构造了一个模拟或约束输运方案。
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来源期刊
CiteScore
3.70
自引率
5.60%
发文量
177
期刊介绍: Series S of Discrete and Continuous Dynamical Systems only publishes theme issues. Each issue is devoted to a specific area of the mathematical, physical and engineering sciences. This area will define a research frontier that is advancing rapidly, often bridging mathematics and sciences. DCDS-S is essential reading for mathematicians, physicists, engineers and other physical scientists. The journal is published bimonthly.
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