对称功能梯度梁自由振动分析的闭式精确解法

Symmetry Pub Date : 2024-09-13 DOI:10.3390/sym16091206
Lorenzo Ledda, Annalisa Greco, Ilaria Fiore, Ivo Caliò
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引用次数: 0

摘要

本研究开发了动态刚度法,用于分析功能分级梁的自然振动特性,在这种情况下,材料特性在梁厚度上按照对称规律分布连续变化。利用汉密尔顿原理导出了自由振动分析的支配运动方程和相关自然边界条件,并获得了欧拉-伯努利和季莫申科梁模型的闭式精确解。确定了动态刚度矩阵,该矩阵控制着梁两端的力和位移之间的关系。利用 Wittrick-Williams 算法,动态刚度矩阵可用于计算固有频率和模态振型。通过将获得的频率与近似的著名公式给出的频率进行比较,验证了所提出的程序。最后,通过改变结构的几何形状和功能分级材料的特征机械参数,进行了参数研究。
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Closed-Form Exact Solution for Free Vibration Analysis of Symmetric Functionally Graded Beams
The dynamic stiffness method is developed to analyze the natural vibration characteristics of functionally graded beams, where material properties change continuously across the beam thickness following a symmetric law distribution. The governing equations of motion and associated natural boundary conditions for free vibration analysis are derived using Hamilton’s principle and closed-form exact solutions are obtained for both Euler–Bernoulli and Timoshenko beam models. The dynamic stiffness matrix, which governs the relationship between force and displacements at the beam ends, is determined. Using the Wittrick–Williams algorithm, the dynamic stiffness matrix is employed to compute natural frequencies and mode shapes. The proposed procedure is validated by comparing the obtained frequencies with those given by approximated well-known formulas. Finally, a parametric investigation is conducted by varying the geometry of the structure and the characteristic mechanical parameters of the functionally graded material.
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