| 任意阶显式精细积分多步法的常用形式及其高阶次数值计算 |
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| 引用本文: | 闫海青,唐晨,张皞,刘铭,张桂敏.任意阶显式精细积分多步法的常用形式及其高阶次数值计算[J].计算物理,2004,21(3):333-338. |
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| 作者姓名: | 闫海青 唐晨 张皞 刘铭 张桂敏 |
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| 作者单位: | 天津大学应用物理系,天津,300072 |
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| 基金项目: | 上海交通大学振动、冲击、噪声国家重点实验室基金(VSN 2003 03)资助项目 |
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| 摘 要: | 基于任意阶显式精细积分多步法的一般公式,给出其几种常用形式,并实现了高阶次数值计算,将新算法应用于射线方程和双原子系统经典轨迹数值计算中.数值计算结果表明任意阶显式精细积分多步法是一种高精度、高效率、稳定性较好的方法,并且可方便地进行高阶次的运算.
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| 关 键 词: | 任意阶显式精细积分多步法 高阶次数值计算 经典轨迹 稳定性分析 非线性现象 |
| 文章编号: | 1001-246X(2004)03-0333-06 |
| 修稿时间: | 2003年2月8日 |
Common Formulae for Free-order Explicit Multistep Method of Precise Time Integration and the Higher Order Numerical Simulation |
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| YAN Hai-qing,TANG Chen,ZHANG Hao,LIU Ming,ZHANG Gui-min.Common Formulae for Free-order Explicit Multistep Method of Precise Time Integration and the Higher Order Numerical Simulation[J].Chinese Journal of Computational Physics,2004,21(3):333-338. |
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| Authors: | YAN Hai-qing TANG Chen ZHANG Hao LIU Ming ZHANG Gui-min |
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| Abstract: | Common formulae for the free-order explicit multistep method of precise time integration are proposed. When the higher order explicit algorithms of precise time integration are applied for calculating the ray equation and the classical trajectories of diatomic system, the effect is admirable. The numerical results reveal that the pressent method is higher accurated and efficient, capable of keeping computational stability for long time simulation, and suitable for higher order numerical computation. |
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| Keywords: | free-order multi-step method of precise integration higher order numerical computation classical trajectory stability analysis |
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