Sequential Optimization of Strip Bending Process Using Multiquadric Radial Basis Function Surrogate Models

Jos Havinga; Gerrit Klaseboer; A.H. van den Boogaard

doi:10.4028/www.scientific.net/KEM.554-557.911

Paper Titles

Route Effects in I-ECAP of AZ31B Magnesium Alloy
p.876

Enhancing Mechanical Properties and Formability of AISI 301LN Stainless Steel Sheet by Local Laser Heat Treatment
p.885

Microstructuring by a Combination of Micro Impact Extrusion and Shear Displacement Forming
p.893

Accuracy of Transferring Microparts in a Multi Stage Former
p.900

Sequential Optimization of Strip Bending Process Using Multiquadric Radial Basis Function Surrogate Models
p.911

Surrogate POD Models for Parametrized Sheet Metal Forming Applications
p.919

Damage Material Parameters Identification Using the ANN-GA Method and the Bulge Test
p.928

On the Development and Computational Implementation of Complex Constitutive Models and Parameters’ Identification Procedures
p.936

Development of an Inverse Routine to Predict Residual Stresses in the Material Based on a Bending Test
p.949

HomeKey Engineering MaterialsKey Engineering Materials Vols. 554-557Sequential Optimization of Strip Bending Process...

Sequential Optimization of Strip Bending Process Using Multiquadric Radial Basis Function Surrogate Models

Abstract:

Surrogate models are used within the sequential optimization strategy for forming processes. A sequential improvement (SI) scheme is used to refine the surrogate model in the optimal region. One of the popular surrogate modeling methods for SI is Kriging. However, the global response of Kriging models deteriorates in some cases due to local model refinement within SI. This may be problematic for multimodal optimization problems and for other applications where correct prediction of the global response is needed. In this paper the deteriorating global behavior of the Kriging surrogate modeling technique is shown for a model of a strip bending process. It is shown that a Radial Basis Function (RBF) surrogate model with Multiquadric (MQ) basis functions performs equally well in terms of optimization efficiency and better in terms of global predictive accuracy. The local point density is taken into account in the model formulation.

You might also be interested in these eBooks

The Current State-of-the-Art on Material Forming

View Preview

Info:

Periodical:

Key Engineering Materials (Volumes 554-557)

Pages:

911-918

DOI:

https://doi.org/10.4028/www.scientific.net/KEM.554-557.911

Citation:

Cite this paper

Online since:

June 2013

Authors:

Jos Havinga, Gerrit Klaseboer, A.H. van den Boogaard

Keywords:

Multiquadric Radial Basis Functions, Robust Expected Improvement, Sequential Robust Optimization, Strip Bending, Surrogate Modelling

Export:

RIS, BibTeX

Price:

Permissions CCC:

Request Permissions

Permissions PLS:

Request Permissions

Сopyright:

Citation:

References

[1] J.H. Wiebenga, A.H. van den Boogaard, G. Klaseboer, Sequential robust optimization of a V-bending process using numerical simulations, Struct. Multidisc. Optim., Vol. 46 (2012) 137–153.

DOI: 10.1007/s00158-012-0761-0

Google Scholar

[2] D.G. Krige, A statistical approach to some basic mine valuation problems on the Witwatersrand, J. S. Afr. I. Min. Metall., Vol. 52 No. 6 (2012) 119-139

Google Scholar

[3] Information on www.megafit-project.eu

Google Scholar

[4] R. Franke, Scattered data interpolation: tests of some methods, Math. Comput., Vol. 38 No. 157 (1982) 181-200

DOI: 10.1090/s0025-5718-1982-0637296-4

Google Scholar

[5] D. Jones, M. Schonlau, W. Welch, Efficient Global Optimization of Expensive Black-Box Functions, J. Global Optim., Vol. 13 No. 4 (1998) 455-492

Google Scholar

[6] F. Jurecka, Robust design optimization based on metamodeling techniques, PhD dissertation (1997)

Google Scholar

[7] J. Janusevskis, R. Le Riche, Simultaneous kriging-based estimation and optimization of mean response, J. Global Optim., (2012) 1-24

DOI: 10.1007/s10898-011-9836-5

Google Scholar

[8] B. Fornberg, J. Zuev, The Runge phenomenon and spatially variable shape parameters in RBF interpolation, Comput. Math. Appl., Vol. 54 No. 3 (2007) 379-398

DOI: 10.1016/j.camwa.2007.01.028

Google Scholar

[9] S. Rippa, An algorithm for selecting a good value for the parameter c in radial basis function interpolation, Adv. Comput. Math., Vol. 11 No. 2 (1999) 193-210

Google Scholar