Topology optimization considering static failure theories for ductile and brittle materials

► It is the first time to consider static failure theories in topology optimization. ► Nonsymmetric designs can be found with different compression and tensile strengths. ► The differentiability of static failure theories is addressed. ► Two and three dimensional problems are considered for stress b...

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Bibliographic Details
Published in:Computers & structures 2012-11, Vol.110-111, p.116-132
Main Authors: Jeong, Seung Hyun, Park, Seon Ho, Choi, Dong-Hoon, Yoon, Gil Ho
Format: Article
Language:English
Subjects:
Approximation
Brittle material
Brittle materials
Criteria
Ductile brittle transition
Ductile material
Failure
Mathematical analysis
Mathematical models
Static failure criteria
Stress-based topology optimization
Topology optimization
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Summary:► It is the first time to consider static failure theories in topology optimization. ► Nonsymmetric designs can be found with different compression and tensile strengths. ► The differentiability of static failure theories is addressed. ► Two and three dimensional problems are considered for stress based design. This research develops a stress-based topology optimization method (STOM) that considers various static failure criteria, including those from the maximum shear stress theory, the distortion energy theory, the ductile Coulomb–Mohr theory, the brittle Coulomb–Mohr theory, and the modified Mohr theory for ductile and brittle materials. Due to some theoretical and numerical challenges, the above static failure theories have not been implemented in topology optimization. By substituting failure formulas that are non-differentiable with respect to the stress components and design variables with differentiable approximation formulas, it is possible to utilize these failure criteria to design mechanical structures that minimize mass.
ISSN:0045-7949
1879-2243
DOI:10.1016/j.compstruc.2012.07.007