| Euler—Lagrange方程的高精度计算方法 |
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| 引用本文: | 王加霞,黄健飞,赵维加.Euler—Lagrange方程的高精度计算方法[J].青岛大学学报(自然科学版),2008,21(1):22-26. |
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| 作者姓名: | 王加霞 黄健飞 赵维加 |
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| 作者单位: | 青岛大学数学科学学院,青岛,266071 |
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| 摘 要: | Euler—Lagrange方程是多体系统动力学的基本方程之一,是高指标的强非线性微分代数方程组。利用零空间方法对Euler—Lagrange方程作简化处理,然后利用高精度谱积分对得到的微分代数方程组作数值离散,形成配置离散格式。针对高阶微分代数方程的离散方程组的病态问题,采用预条件技术改善了方程组的求解条件,然后利用Newton—Krylov方法迭代求解。这种求解技术可以得到任意阶精度且A-稳定算法,并且采用预条件技巧极大的降低了计算的复杂性。
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| 关 键 词: | Euler—Lagrange方程 微分代数方程组 谱积分 Newton—Krylov方法 预处理 |
| 文章编号: | 1006-1037(2008)01-0022-05 |
| 修稿时间: | 2007年9月12日 |
A Algorithm of High Precision for Euler-Lagrange Equations |
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| WANG Jia-xia,HUANG Jian-fei,ZHAO Wei-jia.A Algorithm of High Precision for Euler-Lagrange Equations[J].Journal of Qingdao University(Natural Science Edition),2008,21(1):22-26. |
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| Authors: | WANG Jia-xia HUANG Jian-fei ZHAO Wei-jia |
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| Institution: | (College of Mathematics, Qingdao University, Qingdao 266071, China) |
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| Abstract: | Euler-Lagrange equation, a fundamental equation widely used in scientific study and technical problems, is a large nonlinear high index DAE. First, the Euler-Lagrange equation is simplified by null space technique. Second, by using a high precise spectral integral and a numerical method of high precision, the Euler-I.agrange equation is discretized into a collocation formula. Since the discretized equation systems of high index DAE is an ill-conditioned problem, preconditioning techniques are adopted to improve the condition of the systems. Newton-Krylov schemes is applied to solve the systems. The new algorithm is A-stable, can reach machine accuracy, and requires modest computational expenses due to our preconditioned techniques. |
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| Keywords: | Euler-Lagrange equation DAE spectral integral Newton-Krylov method preconditioning |
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