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矩形截面非圆柱螺旋弹簧的模态分析 被引量:1

Modal analysis of non-cylindrical helical springs with rectangular cross-section
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摘要 对矩形截面非圆柱(锥形、桶形、双曲形)螺旋弹簧的自由振动问题进行了研究。在弹簧的运动微分方程中,首次考虑了簧丝截面的翘曲变形对固有频率的影响。采用改进的Riccati传递矩阵法对包括14个自由度的一阶变系数常微分方程组进行了求解。为了证明理论的有效性,对两端固支矩形截面非圆柱螺旋弹簧的固有频率进行了求解,同时给出了各种参数变化对两端固支矩形截面锥形弹簧固有频率的影响。计算表明,翘曲变形对矩形截面非圆柱螺旋弹簧的固有频率有着重大的影响,在自由振动分析中必须加以考虑。 Free vibration analysis of non-cylindrical(conical,barrel,and hyperboloidal types) helical springs with rectangular cross-section is performed.The effects of the warping deformation of wire cross-section on the natural frequencies are first studied in the differential equations of motion for the springs.Improved Riccati transfer matrix method is introduced to solve the first order ordinary differential equations with variable coefficients,which consist of 14 degrees of freedom.The natural frequencies of non-cylindrical helical springs with rectangular cross-section and clamped-clamped boundary condition are calculated to validate the proposed method,and the effects of various parameters on the natural frequencies of the clamped-clamped conical springs with rectangular cross-section are also investigated.Calculations show that the warping effect upon the natural frequencies is prominent,which should be considered in the free vibration analysis of the springs.
作者 郝颖 虞爱民
机构地区 同济大学航空航天与力学学院
出处 《振动工程学报》 EI CSCD 北大核心 2012年第3期323-329,共7页 Journal of Vibration Engineering
基金 国家自然科学基金资助项目(10572105)
关键词 非圆柱螺旋弹簧 翘曲变形 改进的Riccati传递矩阵法 固有频率 模态 non-cylindrical helical spring warping deformation improved Riccati transfer matrix method natural frequency mode shape
分类号 O327 [理学—一般力学与力学基础]
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参考文献13

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  • 9郝颖,虞爱民.考虑翘曲效应的圆柱螺旋弹簧的振动分析[J].力学学报,2011,43(3):561-569. 被引量:9
  • 10Yu A M, Hao Y. Free vibration analysis of cylindrical helical springs with noncircular cross-sections [J]. Journal of Sound and Vibration, 2011, 330 (11): 2 628-2 639.

二级参考文献5

共引文献14

同被引文献11

  • 1王正.Riccati传递矩阵法的奇点及其消除方法[J].振动与冲击,1987,(2):74-78.
  • 2虞爱民 瞿志豪.自然弯曲与扭曲细长梁广义变分原理的研究.上海冶金专科学校学报,1994,15(3):1-1.
  • 3Yildirm V. Governing equations of initially twisted e- lastic space rods made of laminated composite materi- als[J]. International Journal of Engineering Sciences, 1999,37(8) :1 007-1 035.
  • 4Yildirm V. Free vibration characteristics of composite barrel and hyperboloidalcoil springs[J]. Mechanics of Composite Materials and Structures, 2001, 8 (3): 205-217.
  • 5Yildirm V. A parametric study on the natural frequen- cies of unidirectional composite conical springs [J]. Communications in Numerical Methods in Engineer- ing, 2004,20(3) :207-227.
  • 6Yu A M, Hao Y. Free vibration analysis of cylindrical helical springs with noncircular cross-sections [J]. Journal of Sound and Vibration, 2011, 330 ( 11): 2 628-2 639.
  • 7Xu R Q, He J S, Chen W Q. Saint-Venant torsion of orthotropic bars with inhomogeneous rectangular cross section[J]. Computers &Structures, 2010,92(6): 1 449-1 457.
  • 8王纪瑞,左曙光,雷镭.基于MSC.Marc的中凸螺旋弹簧刚度特性研究[J].佳木斯大学学报(自然科学版),2009,27(6):807-810. 被引量:5
  • 9郝颖,虞爱民.考虑翘曲效应的圆柱螺旋弹簧的振动分析[J].力学学报,2011,43(3):561-569. 被引量:9
  • 10隋刚,范勇峥,仲伟虹,张佐光,孙志杰,陈儒文.复合材料圆柱螺旋弹簧的制造与实验研究[J].复合材料学报,2001,18(1):46-49. 被引量:13

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振动工程学报
2012年 第3期

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