两组典型变量分析双线图,优化显示均值和情况

IF 1.4 4区 计算机科学 Q2 STATISTICS & PROBABILITY
Niel le Roux, Sugnet Gardner-Lubbe
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引用次数: 0

摘要

典型变量分析(CVA)需要进行双面特征值分解。当组数 J 小于变量数 p 时,最多有(J-1)个特征值不完全为零。CVA 双轴图同时显示了两个实体:作为点的组均值和作为校准双轴图轴的变量。因此,对于两个组,组均值可以在一维双图中精确表示,但单个样本是近似的。我们定义了一个标准来衡量在 CVA 双轴图中表示单个样本的质量。然后,针对两组情况,我们提出了构建最佳二维 CVA 双曲线图的额外维度。所提出的新颖 CVA 双曲线图保持了组平均值和双曲线图轴的精确显示,但单个样本点在同时显示组平均值、校准的变量双曲线图轴和组内样本时满足了最优性标准。虽然我们的主要目的是解决两组 CVA 问题,但在实际应用中遇到同样重要的三组比较情况时,我们的建议可立即扩展到最优三维双线图。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

A two-group canonical variate analysis biplot for an optimal display of both means and cases

A two-group canonical variate analysis biplot for an optimal display of both means and cases

Canonical variate analysis (CVA) entails a two-sided eigenvalue decomposition. When the number of groups, J, is less than the number of variables, p, at most \(J-1\) eigenvalues are not exactly zero. A CVA biplot is the simultaneous display of the two entities: group means as points and variables as calibrated biplot axes. It follows that with two groups the group means can be exactly represented in a one-dimensional biplot but the individual samples are approximated. We define a criterion to measure the quality of representing the individual samples in a CVA biplot. Then, for the two-group case we propose an additional dimension for constructing an optimal two-dimensional CVA biplot. The proposed novel CVA biplot maintains the exact display of group means and biplot axes, but the individual sample points satisfy the optimality criterion in a unique simultaneous display of group means, calibrated biplot axes for the variables, and within group samples. Although our primary aim is to address two-group CVA, our proposal extends immediately to an optimal three-dimensional biplot when encountering the equally important case of comparing three groups in practice.

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来源期刊
CiteScore
3.40
自引率
6.20%
发文量
45
审稿时长
>12 weeks
期刊介绍: The international journal Advances in Data Analysis and Classification (ADAC) is designed as a forum for high standard publications on research and applications concerning the extraction of knowable aspects from many types of data. It publishes articles on such topics as structural, quantitative, or statistical approaches for the analysis of data; advances in classification, clustering, and pattern recognition methods; strategies for modeling complex data and mining large data sets; methods for the extraction of knowledge from data, and applications of advanced methods in specific domains of practice. Articles illustrate how new domain-specific knowledge can be made available from data by skillful use of data analysis methods. The journal also publishes survey papers that outline, and illuminate the basic ideas and techniques of special approaches.
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