Authors: Farhad Kolahan, M. Hossein Abolbashari, Samaeddin Mohitzadeh

Abstract:

Several methods are available for weight and shape optimization of structures, among which Evolutionary Structural Optimization (ESO) is one of the most widely used methods. In ESO, however, the optimization criterion is completely case-dependent. Moreover, only the improving solutions are accepted during the search. In this paper a Simulated Annealing (SA) algorithm is used for structural optimization problem. This algorithm differs from other random search methods by accepting non-improving solutions. The implementation of SA algorithm is done through reducing the number of finite element analyses (function evaluations). Computational results show that SA can efficiently and effectively solve such optimization problems within short search time.

Keywords: Simulated annealing, Structural optimization, Compliance, C.V. product.

Digital Object Identifier (DOI): doi.org/10.5281/zenodo.1080762

Procedia APA BibTeX Chicago EndNote Harvard JSON MLA RIS XML ISO 690 PDF Downloads 1898

References:

[1] Y. M. Xie, G. P Steven, "A simple evolutionary procedure for structural optimization." 1993 Computers & Structures; 49:885-96.
[2] P. Tanskanen, "The evolutionary structural optimization method: theoretical aspect", 2002 Comput. Methods Appl. Mech. Engrg. 191 4585-5498.
[3] O.M. Querin, V. Young, G.P. Steven, Y.M. "Xie Computational efficiency and validation of bi-directional evolutionary structural optimization", 2000 Comput. Methods Appl. Mech. Engrg. 189, 559- 573.
[4] X. Huang,Y.M. Xie, "Convergent and mesh-independent solutions for the bi-directional evolutionary structural optimization method", Finite Elements in Analysis and Design 43 (2007) 1039 - 1049.
[5] M. Zhou, G.I.N. Rozvany, "On the validity of ESO type methods in topology optimization", Struct. Multidiscip. Optim. 21 (2001) 80-83.
[6] Xia Liua, Wei-Jian Yia, Q.S. Lib, Pu-Sheng Shena, "Genetic evolutionary structural optimization", Journal of Constructional Steel Research, to be published.
[7] S. Kirkpatrik, C. D. Gelatt, M. P. Vecchi, "Optimization by Simulated Annealing". 1982 IBM Research Report RC 9355.
[8] T. Loukil, J. Teghem, D. Tuyttens, "Solving multi-objective production scheduling problems using met heuristics", 2005 European Journal of Operational Research, 161, 42-61.
[9] W. A Bennage, A. K. Dhingra, "Single and multiobjective structural optimization in discrete-continuous variables using simulated annealing" IntJ Numer Meth Engng 1995;38:2753-73.
[10] X. Huang, Y. M. Xie , "A new look at ESO and BESO optimization methods", Struct Multidisc Optim, Springer-Verlag 2007