Ultraconvergence for Averaging Discontinuous Finite Elements and Its Applications in Hamiltonian System
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摘要: 讨论了常微分方程初值问题的k次平均间断有限元.当k为偶数时,证明了在节点上的平均通量(间断有限元在节点上的左右极限的平均值)有2k+2阶最佳强超收敛性.对具有动量守恒的非线性Hamilton系统(如Schrdinger方程和Kepler系统),发现此类间断有限元在节点上是动量守恒的.这些性质被数值试验所证实.
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关键词:
- 平均间断有限元 /
- 强超收敛 /
- Hamilton系统 /
- 动量守恒
Abstract: The k-degree averaging discontinuous finite element solution for the initial value problem of ordinary differential equations was discussed. When k waseven, it was proved that the averaging numerical flux (the average of left and right lmiits for discon tinuous finite element at nodes) had the optmial order ultraconvergence 2k + 2. For non linear Hamiltonian systems (e. g., S chrêdinger equation and Kepler system) with momentum conservation, it was found that the discon tinuous finite element methods preserve momentum at nodes. These properties were confirmed by numerical expermients. -
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