Assessing Algorithms Used for Constructing Confidence Ellipses in Multidimensional Scaling Solutions

IF 1.8 Q3 COMPUTER SCIENCE, ARTIFICIAL INTELLIGENCE
Algorithms Pub Date : 2023-11-24 DOI:10.3390/a16120535
P. Nikitas, E. Nikita
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Abstract

This paper assesses algorithms proposed for constructing confidence ellipses in multidimensional scaling (MDS) solutions and proposes a new approach to interpreting these confidence ellipses via hierarchical cluster analysis (HCA). It is shown that the most effective algorithm for constructing confidence ellipses involves the generation of simulated distances based on the original multivariate dataset and then the creation of MDS maps that are scaled, reflected, rotated, translated, and finally superimposed. For this algorithm, the stability measure of the average areas tends to zero with increasing sample size n following the power model, An−B, with positive B values ranging from 0.7 to 2 and high R-squared fitting values around 0.99. This algorithm was applied to create confidence ellipses in the MDS plots of squared Euclidean and Mahalanobis distances for continuous and binary data. It was found that plotting confidence ellipses in MDS plots offers a better visualization of the distance map of the populations under study compared to plotting single points. However, the confidence ellipses cannot eliminate the subjective selection of clusters in the MDS plot based simply on the proximity of the MDS points. To overcome this subjective selection, we should quantify the formation of clusters of proximal samples. Thus, in addition to the algorithm assessment, we propose a new approach that estimates all possible cluster probabilities associated with the confidence ellipses by applying HCA using distance matrices derived from these ellipses.
评估用于构建多维标度解决方案置信椭圆的算法
本文评估了在多维缩放(MDS)解决方案中构建置信椭圆的算法,并提出了一种通过分层聚类分析(HCA)解释这些置信椭圆的新方法。研究表明,构建置信椭圆的最有效算法是根据原始多变量数据集生成模拟距离,然后创建经过缩放、反射、旋转、平移并最终叠加的 MDS 地图。在该算法中,随着样本量 n 的增加,平均面积的稳定性测量值趋于零,遵循幂模型 An-B,正 B 值从 0.7 到 2 不等,R 平方拟合值高达 0.99 左右。该算法被用于在连续数据和二进制数据的欧氏平方距离和马哈拉诺比距离的 MDS 图中创建置信椭圆。研究发现,与绘制单点图相比,在 MDS 图中绘制置信椭圆能更好地直观显示所研究人群的距离图。然而,置信椭圆并不能消除在 MDS 图中仅仅根据 MDS 点的接近程度来主观选择聚类的情况。为了克服这种主观选择,我们应该量化近似样本群的形成。因此,除了算法评估之外,我们还提出了一种新方法,即通过使用从置信椭圆得出的距离矩阵来应用 HCA,从而估算与置信椭圆相关的所有可能的聚类概率。
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
Algorithms
Algorithms Mathematics-Numerical Analysis
CiteScore
4.10
自引率
4.30%
发文量
394
审稿时长
11 weeks
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