A consistent approximation of the total perimeter functional for topology optimization algorithms

IF 1.3 3区数学 Q4 AUTOMATION & CONTROL SYSTEMS

Esaim-Control Optimisation and Calculus of Variations Pub Date : 2022-01-20 DOI:10.1051/cocv/2022005

S. Amstutz, C. Dapogny, À. Ferrer

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引用次数: 3

Abstract

This article revolves around the total perimeter functional, one particular version of the perimeter of a shape [[EQUATION]] contained in a fixed computational domain D measuring the total area of its boundary [[EQUATION]], as opposed to its relative perimeter, which only takes into account the regions of [[EQUATION]] strictly inside [[EQUATION]]. We analyze approximate versions of the total perimeter which make sense for general ``density functions'' [[EQUATION]]. Their use in the context of density-based topology optimization is particularly convenient as they do not involve the gradient of the optimized function [[EQUATION]]. Two different constructions are proposed: while the first one involves the convolution of the function [[EQUATION]] with a smooth mollifier, the second one relies on the resolution of an elliptic boundary-value problem featuring Robin boundary conditions. The ``consistency'' of these approximations is appraised from various points of view. At first, we prove the pointwise convergence of our approximate functionals, then the convergence of their derivatives, as the level of smoothing tends to [[EQUATION]], when the considered density function [[EQUATION]] is the characteristic function of a shape [[EQUATION]]. Then, we focus on the [[EQUATION]]-convergence of the second type of approximate total perimeter functional. Several numerical examples are eventually presented.

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拓扑优化算法的总周长泛函的一致近似

本文围绕总周长泛函展开，总周长泛函是形状[[EQUATION]]的一种特殊形式的周长，它包含在一个固定的计算域d中，测量其边界[[EQUATION]]的总面积，而不是其相对周长，它只考虑[[EQUATION]]严格位于[[EQUATION]]内的区域。我们分析了对一般“密度函数”有意义的总周长的近似版本[[方程]]。它们在基于密度的拓扑优化中的使用特别方便，因为它们不涉及优化函数的梯度[[EQUATION]]。提出了两种不同的结构:第一种结构涉及到函数[[EQUATION]]与光滑柔化器的卷积，第二种结构依赖于具有Robin边界条件的椭圆边值问题的解决。这些近似的“一致性”是从不同的角度来评价的。首先，我们证明了近似泛函的点向收敛性，然后证明了它们的导数的收敛性，当所考虑的密度函数[[EQUATION]]是形状[[EQUATION]]的特征函数时，随着平滑程度趋于[[EQUATION]]。然后，我们重点研究了第二类近似全周长泛函的[[EQUATION]]-收敛性。最后给出了几个数值算例。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Esaim-Control Optimisation and Calculus of Variations Mathematics-Computational Mathematics

自引率

7.10%

发文量

期刊介绍： ESAIM: COCV strives to publish rapidly and efficiently papers and surveys in the areas of Control, Optimisation and Calculus of Variations. Articles may be theoretical, computational, or both, and they will cover contemporary subjects with impact in forefront technology, biosciences, materials science, computer vision, continuum physics, decision sciences and other allied disciplines. Targeted topics include: in control: modeling, controllability, optimal control, stabilization, control design, hybrid control, robustness analysis, numerical and computational methods for control, stochastic or deterministic, continuous or discrete control systems, finite-dimensional or infinite-dimensional control systems, geometric control, quantum control, game theory; in optimisation: mathematical programming, large scale systems, stochastic optimisation, combinatorial optimisation, shape optimisation, convex or nonsmooth optimisation, inverse problems, interior point methods, duality methods, numerical methods, convergence and complexity, global optimisation, optimisation and dynamical systems, optimal transport, machine learning, image or signal analysis; in calculus of variations: variational methods for differential equations and Hamiltonian systems, variational inequalities; semicontinuity and convergence, existence and regularity of minimizers and critical points of functionals, relaxation; geometric problems and the use and development of geometric measure theory tools; problems involving randomness; viscosity solutions; numerical methods; homogenization, multiscale and singular perturbation problems.