一种区域简化的形状导数方法

IF 4.3 3区 材料科学 Q1 ENGINEERING, ELECTRICAL & ELECTRONIC ACS Applied Electronic Materials Pub Date : 2023-10-21 DOI:10.1016/j.cad.2023.103636
J. Hinz , O. Chanon , A. Arrigoni , A. Buffa
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引用次数: 0

摘要

这项研究的目的是解决简化几何模型的困难,在几何模型中,微分问题被公式化,也称为失败,同时确保求解的准确性得到控制。这实现了更快、更高效的模拟,而不会牺牲感兴趣区域的准确性。更准确地说,我们考虑了在具有复杂边界的二维简单连接的分层B样条物理域上定义的椭圆模型问题的等几何离散化。从几何结构的过度简化开始,我们建立了一种面向目标的自适应策略,该策略在分析表明对感兴趣的数量有很大影响的区域自适应地重新引入连续的几何特征。该策略由基于一阶形状灵敏度分析的失效误差的后验估计驱动,并利用了层次B样条的局部细化特性。自适应算法与生成(部分)简化的层次B样条几何域的过程一起被描述。数值实验说明了所提出的策略及其局限性。
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A Shape Derivative Approach to Domain Simplification

The objective of this study is to address the difficulty of simplifying the geometric model in which a differential problem is formulated, also called defeaturing, while simultaneously ensuring that the accuracy of the solution is maintained under control. This enables faster and more efficient simulations, without sacrificing accuracy in the regions of interest. More precisely, we consider an isogeometric discretisation of an elliptic model problem defined on a two-dimensional simply connected hierarchical B-spline physical domain with a complex boundary. Starting with an oversimplification of the geometry, we build a goal-oriented adaptive strategy that adaptively reintroduces continuous geometrical features in regions where the analysis suggests a large impact on the quantity of interest. This strategy is driven by an a posteriori estimator of the defeaturing error based on first-order shape sensitivity analysis, and it profits from the local refinement properties of hierarchical B-splines. The adaptive algorithm is described together with a procedure to generate (partially) simplified hierarchical B-spline geometrical domains. Numerical experiments are presented to illustrate the proposed strategy and its limitations.

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来源期刊
CiteScore
7.20
自引率
4.30%
发文量
567
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