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Topology optimization using regularized intermediate density control

โœ Scribed by Thomas Borrvall; Joakim Petersson

Publisher
Elsevier Science
Year
2001
Tongue
English
Weight
199 KB
Volume
190
Category
Article
ISSN
0045-7825

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โœฆ Synopsis

We consider topology optimization of elastic continua. The elasticity tensor is assumed to depend linearly on the design function (density) as in the variable thickness sheet problem. In order to get ``blackยฑwhite'' design pictures, the intermediate density values are controlled by an explicit constraint. This constraint is regularized by including a compact and linear operator S to guarantee existence of solutions. A proof of convergence of the ยฎnite element (FE) discretized optimization problem's solutions to exact ones is also given, so the method is not prone to numerical anomalies such as mesh dependence or checkerboards. The procedure is illustrated in some minimum compliance examples where S is chosen to be a classical convolution-type operator. The FE-discretized optimization problems are solved by sequential convex approximations.

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