亥姆霍兹问题阻抗边界条件中的贝叶斯参数识别

IF 4.3 3区 材料科学 Q1 ENGINEERING, ELECTRICAL & ELECTRONIC
Nick Wulbusch, Reinhild Roden, Matthias Blau, Alexey Chernov
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引用次数: 0

摘要

SIAM 科学计算期刊》,第 46 卷第 4 期,第 B422-B447 页,2024 年 8 月。 摘要我们采用贝叶斯方法考虑了从封闭房间的噪声压力测量值中识别墙面声阻抗的问题。房间声学由带有阻抗边界条件的内部亥姆霍兹方程建模。目的是计算声阻抗的矩,从而估算出阻抗系数的合适密度函数。为了计算矩,我们使用了比率估计器和蒙特卡罗采样。我们考虑了两种不同的实验方案。在第一种情况下,噪声测量结果对应于以阻抗边界条件建模的墙壁。在这种情况下,贝叶斯算法使用与测量结果一致的模型(直至噪声),我们的算法能够高精度地识别声阻抗。在第二种情况下,噪声测量结果来自声学与结构耦合问题,即对玻璃墙进行建模,而贝叶斯算法仍然使用带有阻抗边界条件的模型。在这种情况下,参数识别模型与测量结果不一致,因此不能很好地表示测量结果。不过,对于特定频段,贝叶斯算法识别出的估计值具有很高的可能性。在这些频段之外,该算法就失效了。我们将讨论这两个例子的结果,以及后一种情况在特定频率值下失败的可能原因。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Bayesian Parameter Identification in Impedance Boundary Conditions for Helmholtz Problems
SIAM Journal on Scientific Computing, Volume 46, Issue 4, Page B422-B447, August 2024.
Abstract. We consider the problem of identifying the acoustic impedance of a wall surface from noisy pressure measurements in a closed room using a Bayesian approach. The room acoustics are modeled by the interior Helmholtz equation with impedance boundary conditions. The aim is to compute moments of the acoustic impedance to estimate a suitable density function of the impedance coefficient. For the computation of moments we use ratio estimators and Monte Carlo sampling. We consider two different experimental scenarios. In the first scenario, the noisy measurements correspond to a wall modeled by impedance boundary conditions. In this case, the Bayesian algorithm uses a model that is (up to the noise) consistent with the measurements and our algorithm is able to identify acoustic impedance with high accuracy. In the second scenario, the noisy measurements come from a coupled acoustic-structural problem, modeling a wall made of glass, whereas the Bayesian algorithm still uses a model with impedance boundary conditions. In this case, the parameter identification model is inconsistent with the measurements and therefore is not capable to represent them well. Nonetheless, for particular frequency bands the Bayesian algorithm identifies estimates with high likelihood. Outside these frequency bands the algorithm fails. We discuss the results of both examples and possible reasons for the failure of the latter case for particular frequency values.
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来源期刊
CiteScore
7.20
自引率
4.30%
发文量
567
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