Modeling of Random Fatigue Crack Propagation

机译：随机疲劳裂纹传播建模

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A statistical model is proposed for the analysis of fatigue crack propagation, based on the theory of fracture mechanics and stochastic process. The fatigue growth process is approximated as a diffusive Markov process. The associated backward Fokker-Plank equation and boundary conditions are written, and the distribution of crack propagation time under a given crack size is obtained by using an Eigen-function method. The sought distribution is expressed in the form of a convergent infinite series. An examples is presented to illustrate the application of the method. The predicted results seem to agree with the experimental data.

机译：基于断裂力学和随机过程理论，提出了一种统计模型来分析疲劳裂纹传播。疲劳生长过程近似为扩散马尔可夫过程。写入相关的后向Fokker-Plank方程和边界条件，通过使用特征函数方法获得给定裂纹尺寸下的裂纹传播时间的分布。所寻求的分布以收敛无限系列的形式表示。提出了示例以说明该方法的应用。预测结果似乎同意实验数据。

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《International Conference on Materials Science and Information Technology》|2013年||共3页
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作者
Xiaoli Zou;
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中图分类 TB3-53;
关键词
Probabilistic fracture mechanics; Fatigue crack propagation; Statistical model; Diffusive Markov process;

机译：概率骨折力学;疲劳裂纹传播;统计模型;扩散马尔可夫过程;
入库时间 2022-08-20 22:14:03

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Modeling of Random Fatigue Crack Propagation

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