Latin hypercube sampling and the propagation of uncertainty in analyses of complex systems

被引:1838
|
作者
Helton, JC
Davis, FJ
机构
[1] Sandia Natl Labs, Dept 6849, Albuquerque, NM 87185 USA
[2] Arizona State Univ, Dept Math & Stat, Tempe, AZ 85287 USA
来源
RELIABILITY ENGINEERING & SYSTEM SAFETY | 2003年 / 81卷 / 01期
关键词
aleatory uncertainty; epistemic uncertainty; Latin hypercube sampling; Monte Carlo analysis; random sampling; sensitivity analysis; uncertainty analysis; 1996 PERFORMANCE ASSESSMENT; ISOLATION PILOT-PLANT; RESPONSE-SURFACE METHODOLOGY; MONTE-CARLO TECHNIQUES; CUMULATIVE DISTRIBUTION-FUNCTIONS; SENSITIVITY-ANALYSIS TECHNIQUES; PROBABILISTIC RISK ASSESSMENT; IDENTIFY IMPORTANT FACTORS; COUPLED REACTION SYSTEMS; LARGE-SCALE SIMULATIONS;
D O I
10.1016/S0951-8320(03)00058-9
中图分类号
T [工业技术];
学科分类号
08 ;
摘要
The following techniques for uncertainty and sensitivity analysis are briefly summarized: Monte Carlo analysis, differential analysis, response surface methodology, Fourier amplitude sensitivity test, Sobol' variance decomposition, and fast probability integration. Desirable features of Monte Carlo analysis in conjunction with Latin hypercube sampling are described in discussions of the following topics: (i) properties of random, stratified and Latin hypercube sampling, (ii) comparisons of random and Latin hypercube sampling, (iii) operations involving Latin hypercube sampling (i.e. correlation control, reweighting of samples to incorporate changed distributions, replicated sampling to test reproducibility of results), (iv) uncertainty analysis (i.e. cumulative distribution functions, complementary cumulative distribution functions, box plots), (v) sensitivity analysis (i.e. scatterplots, regression analysis, correlation analysis, rank transformations, searches for nonrandom patterns), and (vi) analyses involving stochastic (i.e. aleatory) and subjective (i.e. epistemic) uncertainty. Published by Elsevier Science Ltd.
引用
收藏
页码:23 / 69
页数:47
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