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Autori principali: Shevade, Raunak, Bhattacharjee, Monika
Natura: Preprint
Pubblicazione: 2026
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Accesso online:https://arxiv.org/abs/2603.08353
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author Shevade, Raunak
Bhattacharjee, Monika
author_facet Shevade, Raunak
Bhattacharjee, Monika
contents We establish the limiting spectral distribution of Kendall's correlation matrices in the moderate high-dimensional regime where the dimension grows slower than the sample size. Our framework allows observations to be independent but not necessarily identically distributed, and accommodates both discrete and continuous data. Unlike existing results developed under i.i.d. observations, our approach remains valid under substantial distributional heterogeneity and also covers certain i.i.d. models beyond previously studied settings. Under mild symmetry and convergence conditions on some traces, we prove that the empirical spectral distribution of a properly centered and scaled Kendall's correlation matrix converges weakly almost surely to a deterministic, generally model-dependent limit. The analysis clarifies how distributional heterogeneity influences the limiting spectrum. As an application, we propose a graphical tool for detecting dependence among components in high-dimensional data and show that ignoring heterogeneity may lead to spurious detection of dependence.
format Preprint
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publishDate 2026
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spellingShingle Limiting Spectral Distribution of moderately large Kendall's correlation matrix and its application
Shevade, Raunak
Bhattacharjee, Monika
Statistics Theory
We establish the limiting spectral distribution of Kendall's correlation matrices in the moderate high-dimensional regime where the dimension grows slower than the sample size. Our framework allows observations to be independent but not necessarily identically distributed, and accommodates both discrete and continuous data. Unlike existing results developed under i.i.d. observations, our approach remains valid under substantial distributional heterogeneity and also covers certain i.i.d. models beyond previously studied settings. Under mild symmetry and convergence conditions on some traces, we prove that the empirical spectral distribution of a properly centered and scaled Kendall's correlation matrix converges weakly almost surely to a deterministic, generally model-dependent limit. The analysis clarifies how distributional heterogeneity influences the limiting spectrum. As an application, we propose a graphical tool for detecting dependence among components in high-dimensional data and show that ignoring heterogeneity may lead to spurious detection of dependence.
title Limiting Spectral Distribution of moderately large Kendall's correlation matrix and its application
topic Statistics Theory
url https://arxiv.org/abs/2603.08353