空间网络模型的超定位

IF 2.1 2区 数学 Q1 MATHEMATICS, APPLIED
Moritz Hauck, Axel Målqvist
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引用次数: 0

摘要

空间网络模型作为一种简化的离散表示法被广泛应用于各种领域,例如血管中的流动、纤维材料的弹性以及多孔材料的孔隙网络模型。然而,由此产生的线性系统通常较大且条件较差,其数值求解具有挑战性。本文针对空间网络模型提出了一种基于超局部正交分解(SLOD)的数值均质化技术,SLOD 是最近针对椭圆多尺度偏微分方程提出的。它提供了精确的粗解空间,其近似特性与材料数据的平滑度无关。SLOD 的一个独特卖点是,它为这些粗解空间构建了一个几乎是局部的基础,与其他最先进的方法相比,它在精细尺度上所需的计算量更少,而在粗解尺度上则实现了更高的稀疏性。我们对提出的方法进行了后验分析,并从数值上证实了该方法独特的本地化特性。此外,我们还展示了该方法对高对比度通道材料数据的适用性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Super-localization of spatial network models

Super-localization of spatial network models

Spatial network models are used as a simplified discrete representation in a wide range of applications, e.g., flow in blood vessels, elasticity of fiber based materials, and pore network models of porous materials. Nevertheless, the resulting linear systems are typically large and poorly conditioned and their numerical solution is challenging. This paper proposes a numerical homogenization technique for spatial network models which is based on the super-localized orthogonal decomposition (SLOD), recently introduced for elliptic multiscale partial differential equations. It provides accurate coarse solution spaces with approximation properties independent of the smoothness of the material data. A unique selling point of the SLOD is that it constructs an almost local basis of these coarse spaces, requiring less computations on the fine scale and achieving improved sparsity on the coarse scale compared to other state-of-the-art methods. We provide an a posteriori analysis of the proposed method and numerically confirm the method’s unique localization properties. In addition, we show its applicability also for high-contrast channeled material data.

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来源期刊
Numerische Mathematik
Numerische Mathematik 数学-应用数学
CiteScore
4.10
自引率
4.80%
发文量
72
审稿时长
6-12 weeks
期刊介绍: Numerische Mathematik publishes papers of the very highest quality presenting significantly new and important developments in all areas of Numerical Analysis. "Numerical Analysis" is here understood in its most general sense, as that part of Mathematics that covers: 1. The conception and mathematical analysis of efficient numerical schemes actually used on computers (the "core" of Numerical Analysis) 2. Optimization and Control Theory 3. Mathematical Modeling 4. The mathematical aspects of Scientific Computing
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