https://www.scipedia.com/wd/index.php?action=history&feed=atom&title=Almeida_et_al_2021aAlmeida et al 2021a - Revision history2026-04-18T11:43:21ZRevision history for this page on the wikiMediaWiki 1.27.0-wmf.10https://www.scipedia.com/wd/index.php?title=Almeida_et_al_2021a&diff=226982&oldid=prevScipediacontent: Scipediacontent moved page Draft Content 170344752 to Almeida et al 2021a2021-07-12T06:38:38Z<p>Scipediacontent moved page <a href="/public/Draft_Content_170344752" class="mw-redirect" title="Draft Content 170344752">Draft Content 170344752</a> to <a href="/public/Almeida_et_al_2021a" title="Almeida et al 2021a">Almeida et al 2021a</a></p>
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</td></tr></table>Scipediacontenthttps://www.scipedia.com/wd/index.php?title=Almeida_et_al_2021a&diff=226981&oldid=prevScipediacontent: Created page with "== Abstract == Stiffness and strength are important structural design criteria. However, most contributions to Topology Optimization (TO) deal with the compliance minimizatio..."2021-07-12T06:38:35Z<p>Created page with "== Abstract == Stiffness and strength are important structural design criteria. However, most contributions to Topology Optimization (TO) deal with the compliance minimizatio..."</p>
<p><b>New page</b></p><div>== Abstract ==<br />
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Stiffness and strength are important structural design criteria. However, most contributions to Topology Optimization (TO) deal with the compliance minimization problem. Controlling stresses in a structure is very important to avoid material failure, but that raises complications in TO, such as: nonlinearity, singularity and high computational cost. The total weight of a structure is also another important criterion in optimal design. The multi-material setting is considered in the present work as it opens the possibility to improve structural performance even further allowing extra weight reduction. Recursive SIMP is used as the material interpolation scheme and design solutions are sought using the ground structure approach. This means that truss-like (lattice) designs are obtained here. The problem is relaxed to the continuum by introducing an artificial density variable and it is solved by a gradientbased algorithm (MMA). A stress-constraint relaxation technique (qp-approach) is applied to overcome the stress singularity phenomenon. A continuation approach is used to guarantee discrete solutions, i.e., only the presence or absence of bars is identified. Therefore, design uniformity in terms of bars cross section areas is ensured. Hence, this work proposes a methodology to perform Multi-Material Topology Optimization (MMTO) of truss structures, with density-based design variables, and subject to stress constraints. To discuss the differences between stiffness and strength-oriented optimal designs, a compliance minimization problem subject to mass constraint is also considered. The example chosen demonstrates the viability of the proposed design methodology and it also reveals differences between the strongest and the stiffest designs.<br />
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== Full document ==<br />
<pdf>Media:Draft_Content_170344752P_IDC13_687.pdf</pdf></div>Scipediacontent