| 王承强,郑长良.裂纹扩展过程中线性内聚力模型计算的半解析有限元法[J].计算力学学报,2006,23(2):146~151 |
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| 裂纹扩展过程中线性内聚力模型计算的半解析有限元法 |
| Semi-analytical finite element method for linear cohesive force model in crack propagation |
| 修订日期:2004-05-06 |
| DOI:10.7511/jslx20062027 |
| 中文关键词: 哈密顿体系 裂纹扩展 内聚力 Dugdale模型 虚拟裂缝模型 半解析有限元法 |
| 英文关键词:Hamiltonian system,crack propagation,cohesive force,dugdale model,fictitious crack model,semi-analytical finite element method |
| 基金项目:国家高技术研究发展计划(863计划) |
| 王承强 郑长良 |
| [1]南京水利科学研究院材料结构所,江苏南京210024 [2]大连理工大学工程力学系工业装备结构分析国家重点实验室,辽宁大连116023 [3]大连海事大学机电与材料工程学院,辽宁大连116026 |
| 摘要点击次数: 1807 |
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| 中文摘要: |
| 提出了求解基于线性内聚力模型的平面裂纹扩展问题的半解析有限元法,利用弹性平面扇形域哈密顿体系的方程,通过分离变量法及共轭辛本征函数向量展开法,推导了一个环形和一个圆形奇异超级解析单元列式,组装这两个超级单元能准确地描述裂纹表面作用有双线性内聚力的平面裂纹尖端场。将该解析元与有限元相结合,构成半解析的有限元法,可求解任意几何形状和载荷的基于线性内聚力模型的平面裂纹扩展问题。典型算例的计算结果表明本文方法简单有效,具有令人满意的精度。 |
| 英文摘要: |
| A semi-analytical finite element method for crack propagation problems based on linear cohesive force model is presented.From the Hamiltonian governing equations of plane elasticity in sectorial domain,the variable separation and eigenfunction expansion techniques are employed to formulate a ring and a circular singular hyper-analytical-elements.The assembly of the two hyper-analytical-elements gives a precise description of the displacement and stress fields in the vicinity of crack tip for a cracked plane subjected to a bilinear cohesive force.The new analytical element can be implemented into FEM program systems to solve crack propagation for plane problems with arbitrary shapes and loads.Numerical results for typical problems show that the method is simple,efficient and accurate. |
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