Abstract
The perimeter functional is known to oppose serious difficulties when it has to be handled within a topology optimization procedure. In this paper, a regularized perimeter functional $\mbox{Per}_\varepsilon$, defined for two- and three-dimensional domains, is introduced. On one hand, the convergence of $\mbox{Per}_\varepsilon$ to the exact perimeter when $\varepsilon$ tends to zero is proved. On the other hand, the topological differentiability of $\mbox{Per}_\varepsilon$ for $\varepsilon>0$ is analyzed. These features lead to the design of a topology optimization algorithm suitable for perimeter-dependent objective functionals. Several numerical results illustrate the method.
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