辛体系下平面热黏弹性圣维南问题的解析解

ANALYTICAL SOLUTION OF SAINT-VENANT PROBLEM FOR THERMO-VISCOELASTICITY IN THE SYMPLECTIC SYSTEM

  • 摘要: 借助积分变换,将辛体系引入平面热黏弹性问题,建立了基本问题的对偶方程,并将全部圣维南问题归结为满足共轭辛正交关系的零本征值本征解问题. 同时,利用变量代换和本征解展开等技术给出了一套求解边界条件问题的具体方法. 算例讨论了几种典型边界条件问题,描述了热黏弹性材料的蠕变和松弛特征,体现了这种辛方法的有效性.

     

    Abstract: With the aid of the integral transformation, thesymplectic system is introduced into the problem of two-dimensionalthermo-viscoelasticity and the dual equations of the fundamental problem areconstructed. All solutions of Saint-Venant problems can be obtained directlyvia zero eigenvalue eigensolutions, which satisfy the conjugatedrelationships of the symplectic orthogonality. Meanwhile, an effectivemethod for boundary problems is provided by thetechnologies of variable substitution and eigensolution expansion. Numericalexamples show that the symplectic method is effective for sometypical boundary problems with creep andrelaxation characteristics of thermo-viscoelasticity.

     

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