Shape optimization for a hyperelastic axisymmetric structure
Journal of Engineering, Design and Technology
ISSN: 1726-0531
Article publication date: 29 April 2014
Abstract
Purpose
This paper aims to describe a shape optimization for hyperelastic axisymmetric structure with an exact sensitivity method.
Design/methodology/approach
The whole shape optimization process is carried out by integrating a closed geometric shape in the real space R2 with boundaries defined by B-splines curves. An exact sensitivity analysis and a mathematical programming method (SQP: Sequential Quadratic Programming) are implemented. The design variables are the control points' coordinates which minimize the Von-Mises criteria, with a constraint that the total material volume of the structure remains constant. The feasibility of the proposed methods is carried out by two numerical examples. Results show that the exact Jacobian has an important computing time reduction.
Findings
Numerical examples are presented to illustrate its performance.
Originality/value
In this work, the sensitivity performance is computed using two numerical methods: the efficient finite difference scheme and the exact Jacobian.
Keywords
Acknowledgements
The authors thankfully acknowledge Nam Ho Kim Associate Professor of Mechanical and Aerospace Engineering at the University of Florida.
Citation
Abdessalem, J., Fakhreddine, D., Said, A. and Mohamed, H. (2014), "Shape optimization for a hyperelastic axisymmetric structure", Journal of Engineering, Design and Technology, Vol. 12 No. 2, pp. 177-194. https://doi.org/10.1108/JEDT-10-2011-0072
Publisher
:Emerald Group Publishing Limited
Copyright © 2014, Emerald Group Publishing Limited