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孙远翔, 宁建国, 刘静. 黏弹性板的大挠度蠕变屈曲[J]. 力学学报, 2006, 38(1): 41-48. DOI: 10.6052/0459-1879-2006-1-2004-143
引用本文: 孙远翔, 宁建国, 刘静. 黏弹性板的大挠度蠕变屈曲[J]. 力学学报, 2006, 38(1): 41-48. DOI: 10.6052/0459-1879-2006-1-2004-143
Creep buckling of viscoelastic plates with geometrical nonlinearity[J]. Chinese Journal of Theoretical and Applied Mechanics, 2006, 38(1): 41-48. DOI: 10.6052/0459-1879-2006-1-2004-143
Citation: Creep buckling of viscoelastic plates with geometrical nonlinearity[J]. Chinese Journal of Theoretical and Applied Mechanics, 2006, 38(1): 41-48. DOI: 10.6052/0459-1879-2006-1-2004-143

黏弹性板的大挠度蠕变屈曲

Creep buckling of viscoelastic plates with geometrical nonlinearity

  • 摘要: 研究了具有初始小挠度受轴向压载黏弹性板的蠕变屈曲问题,在建立控制方程时,利用了von Karman非线性应变-位移关系,并考虑了初始挠度,用标准线性固体模型描述材料的黏弹性特性,在求解非线性积分方程时,利用梯形公式计算记忆积分式,将非线性积分方程化为非线性代数方程进行数值求解,得到了结构的蠕变变形过程. 又将问题退化到小挠度情况进行研究,得到了挠度随时间扩展的解析解,分析了瞬时失稳临界载荷、持久临界载荷的物理意义. 讨论了考虑几何非线性对黏弹性板蠕变屈曲的影响.

     

    Abstract: The creep buckling behavior of viscoelastic plates withinitial deflections, subjected to axial compressive force, is analyzed. Thevon Karman nonlinear geometry equations are introduced in the thesis andstandard linear solid model is employed. In order to change the nonlinearintegral equations to a nonlinear algebraic equation which can be solved byusing a standard subroutine, the trapezium method is used to calculate thehereditary integral expression, then the creep deformation of viscoelasticplate is obtained. Meanwhile, the instantaneous critical loads, durablecritical loads are obtained. On the other hand, the problem of creepbuckling is analyzed by using the linear geometric theory, an analyticalsolution of deflection varying with time is obtained. The influence ofgeometry nonlinearity on the creep buckling of viscoelastic plates isstudied.

     

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