Limiting Spectral Distribution of High-dimensional Multivariate Kendall-τ
Abstract
The multivariate Kendall-τ statistic, denoted by Kn, plays a significant role in robust statistical analysis. This paper establishes the limiting properties of the empirical spectral distribution (ESD) of Kn. We demonstrate that the ESD of 12pKn converges almost surely to the Marcenko--Pastur law with variance parameter 12, analogous to the classical result for sample covariance matrices. Using Stieltjes transform techniques, we extend these results to the independent component model, deriving a fixed-point equation that characterizes the limiting spectral distribution of 12tr Kn. The theoretical findings are validated through comprehensive simulation studies.
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