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论文:2013,Vol:31,Issue(4):540-546 |
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任博, 吕震宙, 王攀, 张磊刚. 分布参数不确定情况下全局灵敏度及高效求解方法[J]. 西北工业大学 |
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Ren Bo, Lu Zhenzhou, Wang Pan, Zhang Leigang. Global Sensitivity Measure for Uncertainty Distribution Parameters and Effective Solution for Obtaining It[J]. Northwestern polytechnical university |
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| 分布参数不确定情况下全局灵敏度及高效求解方法 |
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| 任博, 吕震宙, 王攀, 张磊刚 |
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| 西北工业大学 航空学院, 陕西 西安 710072 |
| 摘要: |
| 针对工程中普遍存在的随机变量分布参数不确定性的问题,为判断分布参数不确定性对模型输出特征值(以失效概率为例)的影响,建立了分析分布参数对模型输出统计特征值影响的全局灵敏度指标,并针对传统方法求解分布参数基于失效概率的全局灵敏度指标需三重抽样,计算量大的问题,提出一种高效求解方法,该方法为两重抽样,快速得出分布参数的全局灵敏度指标。所提方法以中心极限定理为依据,通过在大样本条件下寻找合适的估计量,建立输出统计特征量和中间估计量以及中间估计量和全局灵敏度指标之间的代数关系,近似全局灵敏度指标。由于估计量的良好收敛性,它可在保证与传统蒙特卡洛方法计算结果同等精度的条件下,大幅度减少对模型的计算次数,提高了效率。最后,算例验证所提方法的准确性和高效性。 |
| 关键词:
计算效率
概率密度函数
失效概率
Sobol指标
分布参数不确定性
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| Global Sensitivity Measure for Uncertainty Distribution Parameters and Effective Solution for Obtaining It |
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| Ren Bo, Lu Zhenzhou, Wang Pan, Zhang Leigang |
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| College of Aeronautics, Northwestern Polytechnical University, Xi'an 710072, China |
| Abstract: |
| For the engineering structure involving uncertain distribution parameters, a global sensitivity measure based on failure probability is established.To get the effect of uncertain distribution parameters on the failure prob-ability, traditional Monte Carlo method generally needs a "triple-loop" crude and time consuming sampling proce-dure to compute the established global sensitivity.To overcome the disadvantage of MC method, we propose an im-proved sampling method for global sensitivity measure of failure probability, in which the triple-loop is simplified in-to a"double-loop" and the computing efficiency is greatly improved.The main idea of the proposed method, which is explained in section 1 and 2 of the full paper,consists of:(1) generating samples, (2) searching suitable estima-tors and establishing the relationship between failure probability based global sensitivity measure and the estimators, (3)obtaining the global sensitivity measure.Compared with the traditional MC method, the proposed method is more efficient for the same acceptable precision, due to the fast convergence of the estimators.Calculated results of 1 numerical and 2 engineering examples, presented in section 3, and their analysis demonstrate preliminarily the reasonability of the proposed sensitivity measure and the efficiency of the proposed method. |
| Key words:
Computational efficiency
Probability density function
Failure probability
Sobol' measures
Uncertainty distribution parameters
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| 收稿日期: 2012-10-11
修回日期:
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| DOI: |
| 基金项目: 国家自然科学基金(51175425);航空科学基金(2011ZA53015)资助 |
| 通讯作者:
Email: |
| 作者简介: 任博(1985-),西北工业大学博士研究生,主要从事结构可靠性研究。
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| 作者相关文章 |
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| 任博 在本刊中的所有文章 |
| 吕震宙 在本刊中的所有文章 |
| 王攀 在本刊中的所有文章 |
| 张磊刚 在本刊中的所有文章 |
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参考文献: |
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[1] Kiureghian A D.Analysis of Structure Reliability under Parameter Uncertainties.Probabilistic Engineering Mechanics, 2008,23: 351-358
[2] Helton J C, Davis F J.Latin Hypercube Sampling and the Propagation of Uncertainty in Analyses of Complex Systems.Reliability Engineering and System Safety, 2003, 81 (1): 23-69
[3] Saltelli A, Marivoet J.Non-Parametric Statistics in Sensitivity Analysis for Model Output: a Comparison of Selected Techniques.Reliability Engineering and System Safety, 1990, 28(2): 229-253
[4] Sobol I M.Global Sensitivity Indices for Nonlinear Mathematical Models and Their Monte Carlo Estimates.Mathematic Computer Simulation, 2001, 55(1 - 3): 221-280
[5] Iman R L, Hora S C.A Robust M easure of Uncertainty Importance for Use in Fault Tree System Analysis.Risk Analysis,1990, 10(3): 401-406
[6] Chun M H, Han S J, Tak N I.An Uncertainty Importance Measure Using a Distance Metric for the Change in a Cumulative Distribution Function.Reliability Engineering and System Safety, 2000, 70(3): 313-321
[7] Liu H B, Chen W, Sudjianto A.Relative Entropy Based Method for Probabilistic Sensitivity Analysis in Engineering Design.Journal of Mechanical Design, 2006, 128(2): 326-333
[8] Borgonovo E.A New Uncertainty Importance Measure.Reliability Engineering and System Safety, 2007, 92(6): 771-784
[9] 王 攀, 吕 震宙, 唐樟春.模糊分布参数条件下结构系统的近似效应分析.力学学报, 2012, 20(3): 546-556 Wang P, Lv Z Z, Tang Z C.An Approximate Effect Analysis of Structural System with Fuzzy Distribution Parameters.Chinese Journal of Theoretical and Applied Mechanics, 2012, 20(3): 546-556 (in Chinese)
[10] Li L Y, Lu Z Z.Moment-Independent Importance Measure of Basic Variable and Its State Dependent Parameter Solution.Structural Safety, 2012, 38: 40-47
[11] Wei P F, Lu Z Z, Hao W R.Efficient Sampling Methods for Global Reliability Sensitivity Analysis.Computer Physics Communications, 2012, 183(8): 1728-1743
[12] Ziehn T, Tomlin A S.GUI-HDMR-A Software Tool for Global Sensitivity Analysis of Complex Models.Environmental Modelling & Software, 2009, 24(7): 775-785
[13] Wu Q L, Cournede P H, Mathieu A.An Efficient Computational Method for Global Sensitivity Analysis and Its Application to Tree Growth Modeling.Reliability Engineering and System Safety, 2012, 107(11): 35-43
[14] Wu Q L, Cournede P H.The Use of Sensitivity Analysis for the Design of Functional Structural Plant Models.Procedia-Social and Behavioral Sciences, Sixth International Conference on Sensitivity Analysis of Model Output, 2010
[15] Cai Z Y.Precision Design of Roll-Forging Die and Its Application in the Forming of Automobile Front Axles.J Mater Process Tech, 2005, 168(1): 95-101 |
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