In this paper, we propose a new method to approach the problem of structural shape and topology optimization on manifold (or free-form surfaces). A manifold is conformally mapped onto a 2D rectangle domain, where the level set functions are defined. With conformal mapping, the corresponding covariant derivatives on a manifold can be represented by the Euclidean differential operators multiplied by a scalar. Therefore, the topology optimization problem on a free-form surface can be formulated as a 2D problem in the Euclidean space. To evolve the boundaries on a free-form surface, we propose a modified Hamilton-Jacobi equation and solve it on a 2D plane following the conformal geometry theory. In this way, we can fully utilize the conventional level-set-based computational framework. Compared with other established approaches which need to project the Euclidean differential operators to the manifold, the computational difficulty of our method is highly reduced while all the advantages of conventional level set methods are well preserved. We hope the proposed computational framework can provide a timely solution to increasing applications involving innovative structural designs on free-form surfaces in different engineering fields.
- Design Engineering Division
- Computers and Information in Engineering Division
Topology Optimization of Conformal Structures Using Extended Level Set Methods and Conformal Geometry Theory
Ye, Q, Guo, Y, Chen, S, Gu, XD, & Lei, N. "Topology Optimization of Conformal Structures Using Extended Level Set Methods and Conformal Geometry Theory." Proceedings of the ASME 2018 International Design Engineering Technical Conferences and Computers and Information in Engineering Conference. Volume 2B: 44th Design Automation Conference. Quebec City, Quebec, Canada. August 26–29, 2018. V02BT03A038. ASME. https://doi.org/10.1115/DETC2018-85655
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