| 有限长厚壁圆筒康托洛维奇应力变分解端部偏差的修正 |
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| 引用本文: | 林小松.有限长厚壁圆筒康托洛维奇应力变分解端部偏差的修正[J].工程力学,2002,19(5):144-149. |
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| 作者姓名: | 林小松 |
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| 作者单位: | 湘潭工学院, 湖南, 411201 |
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| 摘 要: | 本文指出文献4]、5]在用康托洛维奇应力变分法解有限长厚壁圆筒轴对称问题时存在的端部应力偏差;提出一个消除该偏差的反向端部效应的问题;通过简单计算推导出满足其全部应力边界条件与平衡微分方程的应力表达式,并用应力变分法求得其解答;数值计算结果表明,该解答较好地修正了文献4]中端部附近应力的偏差。
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| 关 键 词: | 厚壁圆筒 端部应力偏差 康托洛维奇解 |
| 文章编号: | 1000-4750(2002)04-144-06 |
| 收稿时间: | 2001-02-03 |
| 修稿时间: | 2001-04-04 |
THE CORRECTION OF THE STRESSES NEAR THE BOTTOM OF THICK-WALLED CYLINDER OF FINITE LENGTH SOLVED BY THE KANTOROVICH STRESS VARIATION METHOD |
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| LIN Xiao-song.THE CORRECTION OF THE STRESSES NEAR THE BOTTOM OF THICK-WALLED CYLINDER OF FINITE LENGTH SOLVED BY THE KANTOROVICH STRESS VARIATION METHOD[J].Engineering Mechanics,2002,19(5):144-149. |
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| Authors: | LIN Xiao-song |
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| Affiliation: | Xiangtan Polytechnic University, Xiangtan 411201 |
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| Abstract: | In this paper, the bottom stress deviations are highlighted about the axisymmetric solution of the thick-walled cylinder of finite length by the Kantorovich stress variation method. A problem about the inverse bottom effect is proposed to eliminate these deviations. Through a simple manipulation, the stress expressions are presented and the differential equilibrium equations and all stress boundary conditions are satisfied. The solutions for these stresses are obtained by the stress variation method. Numerical results show that the stress deviations near the bottom of the cylinder are corrected satisfactorily well by the present method. |
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| Keywords: | thick-walled cylinder stress deviations near the bottom Kantorovich method |
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