使用协方差矩阵和均值向量收缩估计器的高维判别规则

Pub Date : 2024-06-08 DOI:10.1016/j.jspi.2024.106199
Jaehoan Kim , Junyong Park , Hoyoung Park
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引用次数: 0

摘要

线性判别分析(LDA)是处理大维度、小样本分类问题的一种典型方法。基于协方差矩阵和均值向量的不同类型的估计值,有各种类型的线性判别分析方法。本文考虑基于非参数方法的收缩方法。对于精度矩阵,我们研究了基于稀疏性结构或数据分割的方法。关于均值向量的估计,采用了非参数经验贝叶斯(NPEB)方法和非参数最大似然估计(NPMLE)方法,也分别称为 f 建模和 g 建模。本研究分析了基于协方差矩阵和均值向量组合估计策略的线性判别规则的性能。特别是,本研究提出了 NPEB 方法性能的理论结果,并与之前的研究进行了比较。为了评估本文所讨论的方法,我们使用各种协方差矩阵和均值向量结构进行了仿真研究。此外,还介绍了基因表达和脑电图数据等真实数据示例。
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High dimensional discriminant rules with shrinkage estimators of the covariance matrix and mean vector

Linear discriminant analysis (LDA) is a typical method for classification problems with large dimensions and small samples. There are various types of LDA methods that are based on the different types of estimators for the covariance matrices and mean vectors. In this paper, we consider shrinkage methods based on a non-parametric approach. For the precision matrix, methods based on the sparsity structure or data splitting are examined. Regarding the estimation of mean vectors, Non-parametric Empirical Bayes (NPEB) methods and Non-parametric Maximum Likelihood Estimation (NPMLE) methods, also known as f-modeling and g-modeling, respectively, are adopted. The performance of linear discriminant rules based on combined estimation strategies of the covariance matrix and mean vectors are analyzed in this study. Particularly, the study presents a theoretical result on the performance of the NPEB method and compares it with previous studies. Simulation studies with various covariance matrices and mean vector structures are conducted to evaluate the methods discussed in this paper. Furthermore, real data examples such as gene expressions and EEG data are also presented.

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