4.7 Article

Efficient inner-outer decoupling scheme for non-probabilistic model updating with high dimensional model representation and Chebyshev approximation

Journal

MECHANICAL SYSTEMS AND SIGNAL PROCESSING
Volume 188, Issue -, Pages -

Publisher

ACADEMIC PRESS LTD- ELSEVIER SCIENCE LTD
DOI: 10.1016/j.ymssp.2022.110040

Keywords

Finite element model updating; Non-probabilistic uncertainty; Interval arithmetic; HDMR; Polynomial approximation

Funding

  1. Science and Technology Development Fund, Macau SAR [SKL-IOTSC (UM) -2021-2023]
  2. Research Committee of University of Macau [2020B1212030009, FDCT/017/2020/A1, FDCT/0101/2021/A2]
  3. Guangdong-Hong Kong -Macau Joint Laboratory Program [FDCT/0010/2021/AGJ]
  4. [MYRG2020-00073-IOTSC]
  5. [MYRG2022-00096-IOTSC]
  6. [SRG2019-00194-IOTSC]

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Interval arithmetic is a powerful tool for updating structural models with uncertain-but-bounded parameters. However, the complexity and computational burden of interval model updating hinder its practical application. This study proposes an efficient inner-outer decoupling scheme to address this issue. The scheme decomposes the mathematical operation of interval model updating into two layers, namely, uncertainty propagation and interval optimization, to improve search efficiency and convergence rate.
Interval arithmetic offers a powerful tool for structural model updating when uncertain-but -bounded parameters are considered. However, the application of interval model updating for practical engineering structure is hindered due to model complexity and huge computational burden involved in the repeated evaluations of non-probabilistic constraints. In this light, an efficient inner-outer decoupling scheme is proposed for non-probabilistic model updating in this study. The mathematical operation of interval model updating is decomposed into two layers labelled as inner layer with the operation of uncertainty propagation and outer layer with the operation of interval optimization. In the inner uncertainty propagation, the High Dimensional Model Representation (HDMR) is utilized to enable the decomposition of the model outputs in terms of multivariate inputs into the sum of multiple single-variate functions, which is further approximated by Chebyshev polynomials so that the stationary points of each function can be derived. In the outer layer, a fast-running optimization strategy based on the stationary points of Chebyshev polynomial approximation is proposed to accelerate tracking the bounds of model parameters by avoiding time-consuming brute-force interval optimization. As a result, the orig-inal non-probabilistic updating process with two interacted layers can be completely decoupled into two independent operations of the inner uncertainty propagation and outer interval opti-mization so as to enhance the search efficiency and convergence rate significantly. Two numerical case studies illustrate capability of the proposed method in updating the structural parameters intervals efficiently with the model outputs intervals agreeing well with the testing outputs in-tervals. Two experimental cases of steel plates and the Canton Tower also demonstrate the effi-ciency and advantages of the method in interval model updating.

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