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退化环面上的非线性jerk方程近似周期解的同伦分析方法 被引量:1

Homotopy analysis method for approximate analytical periodic solutions of a nonlinear Jerk equation on a degenerate torus
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摘要 用同伦分析法求解退化环面上的非线性Jerk方程的近似周期和近似解析周期解。所得结果表明文中得到的一阶近似周期和一阶近似解析周期解与Gottlieb用低阶谐波平衡法求解得到的结果一样。当参数和初速度较大时,一阶近似周期与精确周期的百分比误差是4.831 8%,而二阶近似周期与精确周期的百分比误差小于0.219 9%。与数值方法给出的"精确"周期解比较,二阶近似解析周期解比一阶近似解析周期解要精确的多。因此,同伦分析法是求解非线性Jerk方程的一种非常有效的方法。 Here,homotopy analysis method was applied to determine approximate periods and approximate analytical periodic solutions of a nonlinear Jerk equation on a degenerate torus.The results obtained revealed that the first-order approximate analytical periodic solution and the corresponding first-order approximate period are identical to those obtained via the first-order harmonic balance approach by Gottlieb;when the parameter and the initial velocity amplitude are larger,the percentage error of the first-order approximate period in relation to the exact one is 4.8318%,and the percentage error of the second-order approximate period in relation to the exact one is lower than 0.2199%;a comparison of the first and second analytical approximate periodic solutions with the numerically exact solutions shows that the second analytical approximate periodic solution is much more accurate than the first one;thus,homotopy analysis method is very effective for nonlinear Jerk equations.
作者 郑敏毅 胡辉 郭源君
机构地区 湖南科技大学土木工程学院
出处 《振动与冲击》 EI CSCD 北大核心 2010年第5期46-49,77,共5页 Journal of Vibration and Shock
基金 国家自然科学基金资助项目(50775071)
关键词 非线性Jerk方程 近似周期解 谐波平衡法 摄动法 同伦分析法 nonlinear jerk equation approximate periodic solution harmonic balance pertubation homotopy analysis method
分类号 O322 [理学—一般力学与力学基础]
  • 相关文献

参考文献11

  • 1Gottlieb H P W. Harmonic balance approach for a degenerate toms of a nonlinear jerk equation [ J ]. Journal of Sound and Vibration ,2009,322 : 1005 - 1008.
  • 2Posch H A, Hoover W G, Vesely F J. Canonical dynamics of the Noseoscillator : stability, order, and chaos [ J ]. Physical review A, 1986,33 (6) :4253 -4265.
  • 3Wu B S, Lim C W, Sun W P. Improved harmonic balance approach to periodic solutions of nonlinear jerk equation [ J ]. Physics Letters A ,2006,354:95 -100.
  • 4Ma Xieyan, Wei Liping, Guo Zhongjin. He's homotopy perturbation method to periodic solutions of nonlinear Jerk equa- tion[J]. Journal of Sound and Vibration, 2008,314:217 - 227.
  • 5Hu H. Perturbation method for periodic solution of nonlinear jerk equations [J]. Physics Letters A, 2008,372:4205 - 209.
  • 6Liao S J. The proposed homotopy analysis techniques for the solution of nonlinear problems [ D ]. PhD dissertation, Shanghai Jiao Tong University,Shanghai, 1992.
  • 7廖世俊.广义泰勒定理:“同伦分析方法”之有效性的一个数理逻辑证明[J].应用数学和力学,2003,24(1):47-54. 被引量:4
  • 8Liao S J. Beyond Perturbation: Introduction to the Homotopy Analysis Method [ M ]. CRC Press, Boca Raton, Chapman and Hall ,2003.
  • 9成钧,廖世俊.具有多个极限环非线性动力系统的解析近似[J].力学学报,2007,39(5):715-720. 被引量:9
  • 10廖世俊.超越摄动:同伦分析方法基本思想及其应用[J].力学进展,2008,38(1):1-34. 被引量:32

二级参考文献13

共引文献42

同被引文献16

  • 1Gottlieb H P W. Harmonic balance approach to periodic solutions of non-linear jerk equations [ J ]. Journal of Sound and Vibration. 2004,271:671 - 683.
  • 2Wu B S, Lira C W, Sun W P. Improved harmonic balance approach to periodic solutions of nonlinear jerk equation[ J ]. Physics Letters A,2006,354:95 -100.
  • 3Ma X Y, Wei L P, Guo Z J. He's homotopy perturbation method to periodic solutions of nonlinear Jerk equation [ J ]. Journal of Sound and Vibration, 2008,314:217 -227.
  • 4Hu H. Perturbation method for periodic solution of nonlinear jerk equations [ J ]. Physics Letters A, 2008, 372:4205 - 4209.
  • 5Hu H, Zhang M Y, Guo Y J. Iteration calculations of periodic solutions to nonlinear jerk equations [ J ]. Acta Mech, 2010,209 : 269 - 274.
  • 6Liao S J. The proposed homotopy analysis techniques for thesolution of nonlinear problems [ D ]. PhD dissertation, Shanghai:Shanghai Jiao Tong University, 1992.
  • 7Liao S J. Beyond perturbation: introduction to the homotopy analysis method[ M]. CRC Press, Boca Raton, Chapman and Hall, 2003.
  • 8Liao S J. An analytic solution of unsteady boundary-layer flows caused by an impulsively stretching plate [ J ]. Nonlinear Science and Numerical Simulation, 2006,11:326 - 339.
  • 9Abbasbandy S. The application of homotopy analysis method to nonlinear equations arising in heat transfer [ J ]. International Journal of Heat and Mass Transfer, 2006, 49: 2437 - 2445.
  • 10Abbasbandy S. Homotopy analysis method for heat radiation equations[ J ]. International Communications in Heat and Mass Transfer, 2007, 34:380 387.

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振动与冲击
2010年 第5期

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