Stochastic modeling of periodic beams under uncertain boundary conditions and environmental fluctuations

IF 7.1 1区 工程技术 Q1 ENGINEERING, MECHANICAL
Vinícius M. de S. Santos , Yuri A. D. Martins , Henrique E. A. A. dos Santos , Thiago de P. Sales , Domingos A. Rade
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Abstract

Periodic structures have been attracting a great deal of academic and industrial interest lately, due to their distinctive vibration and wave propagation behavior, which can be explored for the development of innovative solutions to structural dynamics and vibroacoustic problems. Although such a potential has been demonstrated in a large number of studies, the investigation of detrimental effects, which can be present in practical applications, is still necessary. This paper reports investigations on the combined influence of uncertainties affecting ambient temperature — which alters material properties and induces stress-stiffening due to constrained thermal dilatation — and boundary conditions (BCs) on the bandgap characteristics of periodic beams. The space-dependent temperature fluctuations are represented as a one-dimensional stationary Gaussian random field, discretized using the Karhunen-Loève expansion, while non-ideal BCs, represented as springs, are modeled as discrete random variables. Sampling-based stochastic analyses of the central frequency and bandwidth of the beam’s attenuation bands are performed using Monte Carlo simulations. The results demonstrate that the variability in the attenuation band features is influenced not only by the coefficients of variation (CVs) of the input random quantities, but also by the correlation length of the random temperature fluctuations. Numerical simulations reveal that the bandgap central frequency is primarily affected by the temperature random field, while the BCs govern the bandwidth. Although low CV and standard deviation values are obtained for the dispersion of the bandgap features, reliability analyses indicate that some designs exhibit low reliability. Increased variability in both the bandgap central frequency and bandwidth is observed for greater temperature correlation lengths and CVs. The contributions of the study include the proposal of a comprehensive stochastic modeling procedure duly accounting for relevant random influences, and evidencing that those influences can be significant, requiring consideration in the design of robust periodic structures.

Abstract Image

不确定边界条件和环境波动下的周期梁随机建模
周期性结构因其独特的振动和波传播行为,近来引起了学术界和工业界的极大兴趣,可用于开发结构动力学和振动声学问题的创新解决方案。尽管大量研究已经证明了这种潜力,但仍有必要对实际应用中可能出现的有害效应进行调查。环境温度会改变材料特性,并因受限热膨胀而导致应力变形,而边界条件(BCs)则会影响周期梁的带隙特性。与空间有关的温度波动被表示为一维静态高斯随机场,并使用卡尔胡宁-洛埃夫扩展进行离散化,而非理想 BCs 则被表示为弹簧,建模为离散随机变量。利用蒙特卡罗模拟对光束衰减带的中心频率和带宽进行了基于采样的随机分析。结果表明,衰减带特征的变化不仅受输入随机量变异系数(CV)的影响,还受随机温度波动相关长度的影响。数值模拟显示,带隙中心频率主要受温度随机场的影响,而带宽则受 BC 的影响。虽然带隙特征的离散性得到了较低的 CV 值和标准偏差值,但可靠性分析表明,某些设计显示出较低的可靠性。温度相关长度和 CV 值越大,带隙中心频率和带宽的变异性就越大。这项研究的贡献包括提出了一个全面的随机建模程序,适当考虑了相关的随机影响,并证明这些影响可能很大,需要在设计稳健的周期结构时加以考虑。
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来源期刊
International Journal of Mechanical Sciences
International Journal of Mechanical Sciences 工程技术-工程:机械
CiteScore
12.80
自引率
17.80%
发文量
769
审稿时长
19 days
期刊介绍: The International Journal of Mechanical Sciences (IJMS) serves as a global platform for the publication and dissemination of original research that contributes to a deeper scientific understanding of the fundamental disciplines within mechanical, civil, and material engineering. The primary focus of IJMS is to showcase innovative and ground-breaking work that utilizes analytical and computational modeling techniques, such as Finite Element Method (FEM), Boundary Element Method (BEM), and mesh-free methods, among others. These modeling methods are applied to diverse fields including rigid-body mechanics (e.g., dynamics, vibration, stability), structural mechanics, metal forming, advanced materials (e.g., metals, composites, cellular, smart) behavior and applications, impact mechanics, strain localization, and other nonlinear effects (e.g., large deflections, plasticity, fracture). Additionally, IJMS covers the realms of fluid mechanics (both external and internal flows), tribology, thermodynamics, and materials processing. These subjects collectively form the core of the journal's content. In summary, IJMS provides a prestigious platform for researchers to present their original contributions, shedding light on analytical and computational modeling methods in various areas of mechanical engineering, as well as exploring the behavior and application of advanced materials, fluid mechanics, thermodynamics, and materials processing.
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