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Title A critical assessment of kriging model variants for high-fidelity uncertainty quantification in dynamics of composite shells
Date 01.07.2017
Number 53324
Abstract This paper presents a critical comparative assessment of Kriging model variants for surrogate based uncertainty propagation considering stochastic natural frequencies of composite doubly curved shells. The five Kriging model variants studied here are: Ordinary Kriging, Universal Kriging based on pseudo-likelihood estimator, Blind Kriging, Co-Kriging and Universal Kriging based on marginal likelihood estimator. First three stochastic natural frequencies of the composite shell are analysed by using a finite element model that includes the effects of transverse shear deformation based on Mindlin’s theory in conjunction with a layer-wise random variable approach. The comparative assessment is carried out to address the accuracy and computational efficiency of five Kriging model variants. Comparative performance of different covariance functions is also studied. Subsequently the effect of noise in uncertainty propagation is addressed by using the Stochastic Kriging. Representative results are presented for both individual and combined stochasticity in layer-wise input parameters to address performance of various Kriging variants for low dimensional and relatively higher dimensional input parameter spaces. The error estimation and convergence studies are conducted with respect to original Monte Carlo Simulation to justify merit of the present investigation. The study reveals that Universal Kriging coupled with marginal likelihood estimate yields the most accurate results, followed by Co-Kriging and Blind Kriging. As far as computational efficiency of the Kriging models is concerned, it is observed that for high-dimensional problems, CPU time required for building the Co-Kriging model is significantly less as compared to other Kriging variants.
URL http://dx.doi.org/10.1007/s11831-016-9178-z
Publisher Archives of Computational Methods in Engineering
Identifier 0
Citation Archives of Computational Methods in Engineering 24 (2017) 495-518
DOI http://dx.doi.org/10.1007/s11831-016-9178-z
Authors Mukhopadhyay, T. ; Chakraborty, S. ; Dey, S. ; Adhikari, S. ; Chowdhury, R.
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