English

A Differential Evaluation Markov Chain Monte Carlo algorithm for Bayesian Model Updating

Computational Engineering, Finance, and Science 2017-10-27 v1 Computation

Abstract

The use of the Bayesian tools in system identification and model updating paradigms has been increased in the last ten years. Usually, the Bayesian techniques can be implemented to incorporate the uncertainties associated with measurements as well as the prediction made by the finite element model (FEM) into the FEM updating procedure. In this case, the posterior distribution function describes the uncertainty in the FE model prediction and the experimental data. Due to the complexity of the modeled systems, the analytical solution for the posterior distribution function may not exist. This leads to the use of numerical methods, such as Markov Chain Monte Carlo techniques, to obtain approximate solutions for the posterior distribution function. In this paper, a Differential Evaluation Markov Chain Monte Carlo (DE-MC) method is used to approximate the posterior function and update FEMs. The main idea of the DE-MC approach is to combine the Differential Evolution, which is an effective global optimization algorithm over real parameter space, with Markov Chain Monte Carlo (MCMC) techniques to generate samples from the posterior distribution function. In this paper, the DE-MC method is discussed in detail while the performance and the accuracy of this algorithm are investigated by updating two structural examples.

Keywords

Cite

@article{arxiv.1710.09486,
  title  = {A Differential Evaluation Markov Chain Monte Carlo algorithm for Bayesian Model Updating},
  author = {M. Sherri and I. Boulkaibet and T. Marwala and M. I. Friswell},
  journal= {arXiv preprint arXiv:1710.09486},
  year   = {2017}
}

Comments

To be published in the IMAC XXXVI, Florida, USA

R2 v1 2026-06-22T22:25:59.631Z