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四边简支压电层合板灵敏度分析的精确解 被引量:2

Exact solution for sensitivity analysis of simply supported piezoelectric laminated plates
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摘要 为了应用弹性力学中的Hamilton正则方程研究压电材料的灵敏度系数问题,基于压电材料的H-R(Hellinger-Reissner)变分原理,简要地导出Hamilton正则方程算子表达式,建立了四边简支板静力学控制方程。根据灵敏度定义,在静力学控制方程的基础上联立灵敏度控制方程,得到了增维的齐次压电材料静力响应和灵敏度系数混合控制方程。应用该方程可以同时求得压电层合板的力学、电学参量及其灵敏度。该算法过程简单、运算效率和稳定性好。数值算例结果与有限差分法的结果比较表明本文方法切实有效。 In order to analyze the sensitivity coefficients of piezoelectric lamina in terms of Hamilton canonical equation,based on the H-R(Hellinger-Reissner) variational principle of piezoelectric materials,the expression of operator was deduced for Hamilton canonical equation,and the governing equations of static response were established for piezoelectric plates simply supported on four sides as well.According to the definition of sensitivity analysis,the hybrid governing equation of static response and sensitivity coefficients was obtained by uniting Hamilton canonical equation and the equation of sensitivity.The mechanic,electric parameters and the sensitivity coefficients of static response would be gained by this hybrid governing equations at the same time.This algorithm simplifies the process and improves the efficiency of calculation and stability.The results of numerical examples,compared with those of the finite difference methods,show that the present solution is efficient.
作者 张宏伟 武锋锋 卿光辉
机构地区 中国民航大学航空工程学院
出处 《复合材料学报》 EI CAS CSCD 北大核心 2010年第1期196-201,共6页 Acta Materiae Compositae Sinica
基金 天津市自然科学基金(07JCYBJC02100) 中国民航大学校基金(05YK07M)
关键词 压电材料 层合板 灵敏度分析 HAMILTON正则方程 混合控制方程 piezoelectric materials laminated plates sensitivity analysis Hamilton canonical equation hybrid governing equation
分类号 O343.2 [理学—固体力学] O176 [理学—基础数学]
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参考文献14

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二级参考文献48

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复合材料学报
2010年 第1期

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