三维空间四面体分区中的四面体退化估算

IF 0.5 4区 数学 Q3 MATHEMATICS
Yu. A. Kriksin,  V. F. Tishkin
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引用次数: 0

摘要

根据四面体的几何特征,提出了对其退化程度的定量估计,并确定了它们与由单个顶点产生的边所产生的局部基数的条件数之间的关系。引入的四面体退化指数概念有多个版本,并确定了它们之间的实际等价性。为了评估特定四面体分割的质量,我们建议计算其四面体元素上退化指数的经验分布函数。我们提出了一种三维空间的不规则模型三角剖分(四面体化或四面体分割),它取决于一个决定其元素质量的控制参数。模型三角形的四面体顶点坐标是一些给定规则网格节点的相应坐标之和,以及它们的随机增量。对于不同的控制参数值,可以计算出四面体退化指数的经验分布函数,该指数被视为三维区域三角剖分中四面体质量的定量特征。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Estimation of Tetrahedron Degeneration in a Tetrahedral Partition of Three-Dimensional Space

Estimation of Tetrahedron Degeneration in a Tetrahedral Partition of Three-Dimensional Space

Based on the geometric characteristics of a tetrahedron, quantitative estimates of its degeneracy are proposed and their relationship with the condition number of local bases generated by the edges emerging from a single vertex is established. The concept of the tetrahedron degeneracy index is introduced in several versions, and their practical equivalence to each other is established. To assess the quality of a particular tetrahedral partition, we propose calculating the empirical distribution function of the degeneracy index on its tetrahedral elements. An irregular model triangulation (tetrahedralization or tetrahedral partition) of three-dimensional space is proposed, depending on a control parameter that determines the quality of its elements. The coordinates of the tetrahedra vertices of the model triangulation tetrahedra are the sums of the corresponding coordinates of the nodes of some given regular mesh and random increments to them. For various values of the control parameter, the empirical distribution function of the tetrahedron degeneracy index is calculated, which is considered as a quantitative characteristic of the quality of tetrahedra in the triangulation of a three-dimensional region.

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来源期刊
Doklady Mathematics
Doklady Mathematics 数学-数学
CiteScore
1.00
自引率
16.70%
发文量
39
审稿时长
3-6 weeks
期刊介绍: Doklady Mathematics is a journal of the Presidium of the Russian Academy of Sciences. It contains English translations of papers published in Doklady Akademii Nauk (Proceedings of the Russian Academy of Sciences), which was founded in 1933 and is published 36 times a year. Doklady Mathematics includes the materials from the following areas: mathematics, mathematical physics, computer science, control theory, and computers. It publishes brief scientific reports on previously unpublished significant new research in mathematics and its applications. The main contributors to the journal are Members of the RAS, Corresponding Members of the RAS, and scientists from the former Soviet Union and other foreign countries. Among the contributors are the outstanding Russian mathematicians.
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