Structural reliability analysis under stochastic seismic excitations and multidimensional limit state based on gamma mixture model and copula function

IF 3 3区 工程技术 Q2 ENGINEERING, MECHANICAL
Da-Wei Jia, Zi-Yan Wu
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引用次数: 0

Abstract

A novel method for analyzing the reliability of structures under non-stationary stochastic seismic excitations, considering the combined effect of multiple structural demand extreme values, is proposed. The spectral representation method is employed to establish a non-stationary stochastic seismic excitation model, and based on the theory of first-passage probability, multiple integral formulas for seismic reliability under multidimensional limit states are derived. The extreme value distribution is established using the Gamma mixture model (GMM). The equations for estimating the model parameters are derived based on both fractional moments and moment-generating functions, while the determination of the number of gamma distribution components is guided by the probability distribution and statistical characteristics of the samples. The joint probability density function (JPDF) for multiple demand extreme values is established by incorporating copula functions to account for correlation, and the fitting accuracy of different copula functions is assessed. The proposed method is illustrated using reinforced concrete (RC) frame structures. The results demonstrate that the fitting accuracy of extreme value distribution can be enhanced by adjusting the number of gamma distribution components in the GMM, which exhibits high accuracy in fitting both the main and tail regions. The presence of correlation can induce variations in the JPDF, thereby exerting an influence on the failure probability. Consequently, disregarding correlation is not conducive to reliability analysis.

基于伽马混合物模型和 copula 函数的随机地震激励和多维极限状态下的结构可靠性分析
考虑多种结构需求极值的综合影响,提出了一种分析非稳态随机地震激励下结构可靠性的新方法。采用频谱表示法建立了非稳态随机地震激励模型,并基于一过概率理论,推导出了多维极限状态下地震可靠性的多重积分公式。利用伽马混合模型(GMM)建立了极值分布。根据分数矩和矩生函数推导出模型参数估计方程,同时根据样本的概率分布和统计特征确定伽马分布分量的数量。通过结合协方差函数来考虑相关性,建立了多个需求极值的联合概率密度函数(JPDF),并评估了不同协方差函数的拟合精度。使用钢筋混凝土(RC)框架结构对所提出的方法进行了说明。结果表明,通过调整 GMM 中伽马分布分量的数量,可以提高极值分布的拟合精度。相关性的存在会引起 JPDF 的变化,从而对失效概率产生影响。因此,忽略相关性不利于可靠性分析。
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来源期刊
Probabilistic Engineering Mechanics
Probabilistic Engineering Mechanics 工程技术-工程:机械
CiteScore
3.80
自引率
15.40%
发文量
98
审稿时长
13.5 months
期刊介绍: This journal provides a forum for scholarly work dealing primarily with probabilistic and statistical approaches to contemporary solid/structural and fluid mechanics problems encountered in diverse technical disciplines such as aerospace, civil, marine, mechanical, and nuclear engineering. The journal aims to maintain a healthy balance between general solution techniques and problem-specific results, encouraging a fruitful exchange of ideas among disparate engineering specialities.
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