Constrained shape optimization problem in elastic mechanics : dedicated to Professor Dinh Nho Hao on the occasion of his 60th birthday
- Author
- Van Chien Le (UGent) and Thi Thanh Mai Ta
- Organization
- Abstract
- The main purpose of this article is to present a numerical method for geometrical shape optimization in the context of linear elastic structures. Our approach is based on the gradient method, where the shape derivative is computed by Cea's fast derivation method via Hadamard's boundary variation. In addition, we benefit the augmented Lagrangian method which combines the objective function and constraints into a penalty function to consider the given constrained optimization by solving an unconstrained problem. The regularity of moving mesh is ensured by topological gradient resmoothing techniques. Our numerical scheme converges to a (local) minimum solution, illustrated by several numerical experiments in the contexts of structural mechanics with the classical compliance objective function and volume constraint.
- Keywords
- Applied Mathematics, Computational Mathematics, Constrained shape optimization, Linear elastic structures, Sensitivity analysis, Augmented Lagrangian method, FreeFem plus plus
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Citation
Please use this url to cite or link to this publication: http://hdl.handle.net/1854/LU-8719765
- MLA
- Le, Van Chien, and Thi Thanh Mai Ta. “Constrained Shape Optimization Problem in Elastic Mechanics : Dedicated to Professor Dinh Nho Hao on the Occasion of His 60th Birthday.” COMPUTATIONAL & APPLIED MATHEMATICS, vol. 40, no. 7, 2021, doi:10.1007/s40314-021-01632-1.
- APA
- Le, V. C., & Ta, T. T. M. (2021). Constrained shape optimization problem in elastic mechanics : dedicated to Professor Dinh Nho Hao on the occasion of his 60th birthday. COMPUTATIONAL & APPLIED MATHEMATICS, 40(7). https://doi.org/10.1007/s40314-021-01632-1
- Chicago author-date
- Le, Van Chien, and Thi Thanh Mai Ta. 2021. “Constrained Shape Optimization Problem in Elastic Mechanics : Dedicated to Professor Dinh Nho Hao on the Occasion of His 60th Birthday.” COMPUTATIONAL & APPLIED MATHEMATICS 40 (7). https://doi.org/10.1007/s40314-021-01632-1.
- Chicago author-date (all authors)
- Le, Van Chien, and Thi Thanh Mai Ta. 2021. “Constrained Shape Optimization Problem in Elastic Mechanics : Dedicated to Professor Dinh Nho Hao on the Occasion of His 60th Birthday.” COMPUTATIONAL & APPLIED MATHEMATICS 40 (7). doi:10.1007/s40314-021-01632-1.
- Vancouver
- 1.Le VC, Ta TTM. Constrained shape optimization problem in elastic mechanics : dedicated to Professor Dinh Nho Hao on the occasion of his 60th birthday. COMPUTATIONAL & APPLIED MATHEMATICS. 2021;40(7).
- IEEE
- [1]V. C. Le and T. T. M. Ta, “Constrained shape optimization problem in elastic mechanics : dedicated to Professor Dinh Nho Hao on the occasion of his 60th birthday,” COMPUTATIONAL & APPLIED MATHEMATICS, vol. 40, no. 7, 2021.
@article{8719765,
abstract = {{The main purpose of this article is to present a numerical method for geometrical shape optimization in the context of linear elastic structures. Our approach is based on the gradient method, where the shape derivative is computed by Cea's fast derivation method via Hadamard's boundary variation. In addition, we benefit the augmented Lagrangian method which combines the objective function and constraints into a penalty function to consider the given constrained optimization by solving an unconstrained problem. The regularity of moving mesh is ensured by topological gradient resmoothing techniques. Our numerical scheme converges to a (local) minimum solution, illustrated by several numerical experiments in the contexts of structural mechanics with the classical compliance objective function and volume constraint.}},
articleno = {{240}},
author = {{Le, Van Chien and Ta, Thi Thanh Mai}},
issn = {{2238-3603}},
journal = {{COMPUTATIONAL & APPLIED MATHEMATICS}},
keywords = {{Applied Mathematics,Computational Mathematics,Constrained shape optimization,Linear elastic structures,Sensitivity analysis,Augmented Lagrangian method,FreeFem plus plus}},
language = {{eng}},
number = {{7}},
pages = {{23}},
title = {{Constrained shape optimization problem in elastic mechanics : dedicated to Professor Dinh Nho Hao on the occasion of his 60th birthday}},
url = {{http://doi.org/10.1007/s40314-021-01632-1}},
volume = {{40}},
year = {{2021}},
}
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