Deliang Dai scite author profile

In this paper we derive central limit theorems for two dierent types of Mahalanobis distances in situations where the dimension of the parent variable increases proportionally with the sample size. It is shown that although the two estimators are closely related and behave similarly in nite dimensions, they have dierent convergence rates and are also centred at two dierent points in high-dimensional settings. The limiting distributions are shown to be valid under some general moment conditions and hence available in a wide range of applications.

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Mahalanobis Distances on Factor Model Based Estimation

Dai

2020

Econometrics

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A factor model based covariance matrix is used to build a new form of Mahalanobis distance. The distribution and relative properties of the new Mahalanobis distances are derived. A new type of Mahalanobis distance based on the separated part of the factor model is defined. Contamination effects of outliers detected by the new defined Mahalanobis distances are also investigated. An empirical example indicates that the new proposed separated type of Mahalanobis distances predominate the original sample Mahalanobis distance.

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Expected and unexpected values of individual Mahalanobis distances

Dai

Holgersson

Karlsson

2017

Communications in Statistics - Theory and Methods

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High-Dimensional Mahalanobis Distances of Complex Random Vectors

Dai

Liang

2021

Mathematics

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In this paper, we investigate the asymptotic distributions of two types of Mahalanobis distance (MD): leave-one-out MD and classical MD with both Gaussian- and non-Gaussian-distributed complex random vectors, when the sample size n and the dimension of variables p increase under a fixed ratio c=p/n→∞. We investigate the distributional properties of complex MD when the random samples are independent, but not necessarily identically distributed. Some results regarding the F-matrix F=S2−1S1—the product of a sample covariance matrix S1 (from the independent variable array (be(Zi)1×n) with the inverse of another covariance matrix S2 (from the independent variable array (Zj≠i)p×n)—are used to develop the asymptotic distributions of MDs. We generalize the F-matrix results so that the independence between the two components S1 and S2 of the F-matrix is not required.

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Deliang Dai

Contamination of heavy metals and metalloids in biomass and waste fuels: Comparative characterisation and trend estimation

High-Dimensional CLTs for Individual Mahalanobis Distances

Mahalanobis Distances on Factor Model Based Estimation

Expected and unexpected values of individual Mahalanobis distances

High-Dimensional Mahalanobis Distances of Complex Random Vectors

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