Stress-constrained topology optimization using the velocity field level set method

IF 4.4 2区 工程技术 Q1 COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS Computers & Structures Pub Date : 2024-11-02 DOI:10.1016/j.compstruc.2024.107577
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Abstract

This paper proposes a stress-constrained structural topology optimization method in the velocity field level set framework. To avoid the strength failure in structures, the stress should meet certain strength criteria at all material points. This point-wise constraint brings great difficulty to topology optimization. Instead of using the traditional aggregation scheme, we propose a new stress constraint in the single domain integral form, which is mathematically equivalent to the point-wise stress limitation and enables the precise stress control throughout the entire material domain without introducing numerous constraints. Its simple expression with relatively low non-linearity facilitates the optimization formulation, the sensitivity analysis and the numerical implementation. Here, the velocity field level set method is used for the stress-constraint topology optimization. The implicit material representation by the level set model is combined with the body-fitted mesh, which provides a clear and smooth material boundary with high numerical calculation accuracy for the stress and the sensitivity. Moreover, the velocity field level set method maps the original boundary variation-based optimization problem from the functional design space into a finite-dimensional one by introducing the velocity field design variables. Thus, it allows using of the general mathematical optimization algorithms in the level set model, which provides an efficient and steady way to deal with the stress-constrained optimization problems.
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利用速度场水平集法进行应力约束拓扑优化
本文在速度场水平集框架下提出了一种应力约束结构拓扑优化方法。为避免结构强度失效,所有材料点的应力都应满足一定的强度标准。这种以点为单位的约束给拓扑优化带来了很大困难。我们没有采用传统的聚合方案,而是提出了一种新的单域积分形式的应力约束,它在数学上等同于点向应力限制,可以在不引入大量约束的情况下对整个材料域进行精确的应力控制。它的表达式简单,非线性相对较低,有利于优化表述、灵敏度分析和数值实现。这里采用速度场水平集方法进行应力约束拓扑优化。水平集模型的隐式材料表示与体拟合网格相结合,提供了清晰平滑的材料边界,并具有较高的应力和灵敏度数值计算精度。此外,速度场水平集方法通过引入速度场设计变量,将原来基于边界变化的优化问题从函数设计空间映射到有限维空间。因此,它允许在水平集模型中使用一般的数学优化算法,为处理应力受限的优化问题提供了一种高效、稳定的方法。
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来源期刊
Computers & Structures
Computers & Structures 工程技术-工程:土木
CiteScore
8.80
自引率
6.40%
发文量
122
审稿时长
33 days
期刊介绍: Computers & Structures publishes advances in the development and use of computational methods for the solution of problems in engineering and the sciences. The range of appropriate contributions is wide, and includes papers on establishing appropriate mathematical models and their numerical solution in all areas of mechanics. The journal also includes articles that present a substantial review of a field in the topics of the journal.
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