%0 Journal Article
%T 向量组线性相关性评判方法分析<br>Analysis of Linear Correlation Evaluation Methods for Vector Groups
%A 李婷婷
%J Pure Mathematics
%P 17-22
%@ 2160-7605
%D 2024
%I Hans Publishing
%R 10.12677/PM.2024.141003
%X 线性代数研究的是线性映射关系，线性映射在有限维向量空间上体现为基的变换，基是可以唯一线性表示向量空间中任意向量的一组向量，而向量与向量组之间线性组合的相关性体现了基在不同方面的属性。本文对向量组线性相关性的评判方法进行了分析和比较，从不同的角度对向量组之间的相关性与无关性进行了总结，然后给出了向量组线性相关性的评判方法，并对它们进行了详细的阐述和比较。最后给出了各种方法的优缺点和适用范围，为读者在实践中选择合适的方法提供了参考。<br />
Linear algebra studies linear mapping relationships, which are manifested as transformations of bases on a finite dimensional vector space. Bases are a set of vectors that can uniquely represent any vector in the vector space linearly. The correlation between linear combinations of vectors re-flects the properties of bases in different aspects. This article analyzes and compares the evaluation methods for the linear correlation of vector groups, summarizes the correlation and irrelevance between vector groups from different perspectives, and then provides the evaluation methods for the linear correlation of vector groups, and elaborates and compares them in detail. Finally, the advantages, disadvantages, and applicability of various methods are presented, providing readers with reference for selecting appropriate methods in practice.
%K 向量组，线性相关，线性无关，评判方法<br>Vector Group
%K Linear Correlation
%K Linear Independence
%K Evaluation Method
%U http://www.hanspub.org/journal/PaperInformation.aspx?PaperID=79052