Checkerboard instabilities in topological shape optimization algorithms

Abstract

Checkerboards instabilities for an algorithm of topological design are studied on a simple example. The algorithm uses orthogonal rank-2 laminates as design variables, which need to be regularized as the associated Hooke’s laws are degenerate. When the displacements are approximated by Q1 or Q1-bubble elements, the discrete operator is linearized, and its eigenvalues are computed in terms of the regularization parameter.

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Cite this paper

@inproceedings{BonnetierCheckerboardII, title={Checkerboard instabilities in topological shape optimization algorithms}, author={Eric Bonnetier and François Jouve} }