Discretization of Non-uniform Rational B-Spline (NURBS) Models for Meshless Isogeometric Analysis

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS
Urban Duh, Varun Shankar, Gregor Kosec
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引用次数: 0

Abstract

We present an algorithm for fast generation of quasi-uniform and variable-spacing nodes on domains whose boundaries are represented as computer-aided design (CAD) models, more specifically non-uniform rational B-splines (NURBS). This new algorithm enables the solution of partial differential equations within the volumes enclosed by these CAD models using (collocation-based) meshless numerical discretizations. Our hierarchical algorithm first generates quasi-uniform node sets directly on the NURBS surfaces representing the domain boundary, then uses the NURBS representation in conjunction with the surface nodes to generate nodes within the volume enclosed by the NURBS surface. We provide evidence for the quality of these node sets by analyzing them in terms of local regularity and separation distances. Finally, we demonstrate that these node sets are well-suited (both in terms of accuracy and numerical stability) for meshless radial basis function generated finite differences discretizations of the Poisson, Navier-Cauchy, and heat equations. Our algorithm constitutes an important step in bridging the field of node generation for meshless discretizations with isogeometric analysis.

Abstract Image

非均匀有理 B-样条线 (NURBS) 模型的离散化,用于无网格等距分析
我们提出了一种在边界以计算机辅助设计(CAD)模型(更具体地说是非均匀有理 B-样条曲线(NURBS))表示的域上快速生成准均匀和可变间距节点的算法。利用这种新算法,可以使用(基于配位的)无网格数值离散法求解这些 CAD 模型所包围体积内的偏微分方程。我们的分层算法首先在代表域边界的 NURBS 表面上直接生成准均匀节点集,然后结合表面节点使用 NURBS 表示法在 NURBS 表面所包围的体积内生成节点。我们通过分析这些节点集的局部规则性和分离距离,为其质量提供了证据。最后,我们证明了这些节点集非常适合于对泊松方程、纳维-考奇方程和热方程进行无网格径向基函数有限差分离散化(在精度和数值稳定性方面)。我们的算法是连接无网格离散化节点生成与等时几何分析领域的重要一步。
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
ACS Applied Bio Materials
ACS Applied Bio Materials Chemistry-Chemistry (all)
CiteScore
9.40
自引率
2.10%
发文量
464
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