Topology optimization of three-dimensional linear elastic structures with a constraint on "perimeter"

This work presents a computational model for the topology optimization of a three-dimensional linear elastic structure. The model uses a material dist ribution approach and the optimization criterion is the structural complian ce, subjected to an isoperimetric constraint on volume. Usually the obtaine d topologies using this approach do not characterize a well-defined structu re, i.e, it has regions with porous material and/or with checkerboard patte rns. To overcome these problems an additional constraint on perimeter and a penalty on intermediate volume fraction are considered. The necessary cond itions for optimum are derived analytically, approximated numerically throu gh a suitable finite element discretization and solved by a first-order met hod based on the optimization problem augmented Lagrangian. The computation al model is tested in several numerical applications. (C) 1999 Published by Elsevier Science Ltd. All rights reserved.