基于单元格的最小协方差行列式估计量

The Cellwise Minimum Covariance Determinant Estimator

Journal of the American Statistical Association · 2023
被引 27 · 同刊同年前 7%
ABS 4

中文导读

提出一种针对单元格异常值的稳健协方差矩阵估计方法cellMCD,通过观测似然和惩罚项识别异常单元格,保留正常单元格信息,算法快速且性能良好。

Abstract

The usual Minimum Covariance Determinant (MCD) estimator of a covariance matrix is robust against casewise outliers. These are cases (that is, rows of the data matrix) that behave differently from the majority of cases, raising suspicion that they might belong to a different population. On the other hand, cellwise outliers are individual cells in the data matrix. When a row contains one or more outlying cells, the other cells in the same row still contain useful information that we wish to preserve. We propose a cellwise robust version of the MCD method, called cellMCD. Its main building blocks are observed likelihood and a penalty term on the number of flagged cellwise outliers. It possesses good breakdown properties. We construct a fast algorithm for cellMCD based on concentration steps (C-steps) that always lower the objective. The method performs well in simulations with cellwise outliers, and has high finite-sample efficiency on clean data. It is illustrated on real data with visualizations of the results.

稳健统计协方差矩阵估计异常值检测数据清洗