求解加性和/或乘性白噪声下强非线性系统高维静态 FPK 方程的高效方法

IF 3 3区 工程技术 Q2 ENGINEERING, MECHANICAL
Yangyang Xiao , Lincong Chen , Zhongdong Duan , Jianqiao Sun , Yanan Tang
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引用次数: 0

摘要

在恶劣的环境中,工程结构可能会发生剧烈的非线性随机振动。自 20 世纪 60 年代以来,人们对随机振动进行了广泛的研究,但对于大规模强非线性系统而言,随机振动仍是一个有待解决的问题。本文提出了一种基于神经网络的随机振动分析方法,适用于加性和/或乘性高斯白噪声(GWN)激励下的大规模强非线性系统。在该方法中,首先将控制状态概率密度函数(PDF)的高维稳态福克-普朗克-科尔莫戈罗夫(FPK)方程简化为只涉及相关状态变量的低维 FPK 方程,一般为一维或两维。低维 FPK 方程中的等效漂移系数(EDC)和扩散系数(EDF)被证明是给定相关变量的系数的条件平均值。此外,还证明了条件平均值可以通过回归进行最优估计。随后,EDCs 和 EDFs 作为保留变量的函数,通过半解析径向基函数神经网络进行近似,该神经网络由一些确定性分析产生的样本进行训练。最后,利用物理信息神经网络求解简化的稳态 FPK 方程,得到系统响应的 PDF。在加性和/或乘性 GWN 激励下的四个典型例子中,通过将所提方法的结果与精确解(如果有的话)或蒙特卡罗模拟进行比较,检验了所提方法的准确性和效率。与同类方法中基于全局演化的广义密度演化方程方案相比,所提出的方法也表现出更高的准确性,尤其是对于强非线性系统。值得注意的是,尽管本文应用的是稳态系统,但将所提出的框架扩展到瞬态系统并不存在障碍。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
An efficient method for solving high-dimension stationary FPK equation of strongly nonlinear systems under additive and/or multiplicative white noise

Engineering structures may suffer from drastic nonlinear random vibrations in harsh environments. Random vibration has been extensively studied since 1960s, but is still an open problem for large-scale strongly nonlinear systems. In this paper, a random vibration analysis method based on the Neural Networks for large-scale strongly nonlinear systems under additive and/or multiplicative Gaussian white noise (GWN) excitations is proposed. In the proposed method, the high-dimensional steady-state Fokker–Planck-Kolmogorov (FPK) equation governing the state’s probability density function (PDF) is firstly reduced to low-dimensional FPK equation involving only the interested state variables, generally one or two dimensions. The equivalent drift coefficients (EDCs) and diffusion coefficients (EDFs) in the low-dimensional FPK equation are proven to be the conditional mean of the coefficients given the interested variables. Furthermore, it is shown that the conditional mean can be optimally estimated by regression. Subsequently, the EDCs and EDFs, as functions of the retained variables, are approximated by the semi-analytical Radial Basis Functions Neural Networks trained with samples generated by a few deterministic analyses. Finally, the Physics Informed Neural Network is employed to solve the reduced steady-state FPK equation, and the PDF of the system responses is obtained. Four typical examples under additive and/or multiplicative GWN excitations are used to examine the accuracy and efficiency of the proposed method by comparing its results with the exact solution (if available) or Monte Carlo simulations. The proposed method also exhibits greater accuracy than the globally-evolving-based generalized density evolution equation scheme, a similar method of its kind, especially for strongly nonlinear systems. Notably, even though steady-state systems are applied in this paper, there is no obstacle to extending the proposed framework to transient systems.

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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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