TY - JOUR

T1 - The role of the Bhattacharyya distance in stochastic model updating

AU - Bi, Sifeng

AU - Broggi, Matteo

AU - Beer, Michael

N1 - Funding information: This work is supported by the Alexander von Humboldt Foundation , which is greatly appreciated by the first author.

PY - 2019/2/15

Y1 - 2019/2/15

N2 - The Bhattacharyya distance is a stochastic measurement between two samples and taking into account their probability distributions. The objective of this work is to further generalize the application of the Bhattacharyya distance as a novel uncertainty quantification metric by developing an approximate Bayesian computation model updating framework, in which the Bhattacharyya distance is fully embedded. The Bhattacharyya distance between sample sets is evaluated via a binning algorithm. And then the approximate likelihood function built upon the concept of the distance is developed in a two-step Bayesian updating framework, where the Euclidian and Bhattacharyya distances are utilized in the first and second steps, respectively. The performance of the proposed procedure is demonstrated with two exemplary applications, a simulated mass-spring example and a quite challenging benchmark problem for uncertainty treatment. These examples demonstrate a gain in quality of the stochastic updating by utilizing the superior features of the Bhattacharyya distance, representing a convenient, efficient, and capable metric for stochastic model updating and uncertainty characterization.

AB - The Bhattacharyya distance is a stochastic measurement between two samples and taking into account their probability distributions. The objective of this work is to further generalize the application of the Bhattacharyya distance as a novel uncertainty quantification metric by developing an approximate Bayesian computation model updating framework, in which the Bhattacharyya distance is fully embedded. The Bhattacharyya distance between sample sets is evaluated via a binning algorithm. And then the approximate likelihood function built upon the concept of the distance is developed in a two-step Bayesian updating framework, where the Euclidian and Bhattacharyya distances are utilized in the first and second steps, respectively. The performance of the proposed procedure is demonstrated with two exemplary applications, a simulated mass-spring example and a quite challenging benchmark problem for uncertainty treatment. These examples demonstrate a gain in quality of the stochastic updating by utilizing the superior features of the Bhattacharyya distance, representing a convenient, efficient, and capable metric for stochastic model updating and uncertainty characterization.

KW - Approximate Bayesian computation

KW - Bayesian updating

KW - Model validation

KW - Stochastic model updating

KW - Uncertainty quantification

UR - http://www.scopus.com/inward/record.url?scp=85051646153&partnerID=8YFLogxK

U2 - 10.1016/j.ymssp.2018.08.017

DO - 10.1016/j.ymssp.2018.08.017

M3 - Article

AN - SCOPUS:85051646153

VL - 117

SP - 437

EP - 452

JO - Mechanical Systems and Signal Processing

JF - Mechanical Systems and Signal Processing

SN - 0888-3270

ER -