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Autores principales: García-Medina, Andrés, Miccichè, Salvatore, Mantegna, Rosario N.
Formato: Preprint
Publicado: 2022
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Acceso en línea:https://arxiv.org/abs/2212.14650
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author García-Medina, Andrés
Miccichè, Salvatore
Mantegna, Rosario N.
author_facet García-Medina, Andrés
Miccichè, Salvatore
Mantegna, Rosario N.
contents We investigate block diagonal and hierarchical nested stochastic multivariate Gaussian models by studying their sample cross-correlation matrix on high dimensions. By performing numerical simulations, we compare a filtered sample cross-correlation with the population cross-correlation matrices by using several rotationally invariant estimators (RIE) and hierarchical clustering estimators (HCE) under several loss functions. We show that at large but finite sample size, sample cross-correlation filtered by RIE estimators are often outperformed by HCE estimators for several of the loss functions. We also show that for block models and for hierarchically nested block models the best determination of the filtered sample cross-correlation is achieved by introducing two-step estimators combining state-of-the-art non-linear shrinkage models with hierarchical clustering estimators.
format Preprint
id arxiv_https___arxiv_org_abs_2212_14650
institution arXiv
publishDate 2022
record_format arxiv
spellingShingle Two-step estimators of high dimensional correlation matrices
García-Medina, Andrés
Miccichè, Salvatore
Mantegna, Rosario N.
Methodology
Physics and Society
We investigate block diagonal and hierarchical nested stochastic multivariate Gaussian models by studying their sample cross-correlation matrix on high dimensions. By performing numerical simulations, we compare a filtered sample cross-correlation with the population cross-correlation matrices by using several rotationally invariant estimators (RIE) and hierarchical clustering estimators (HCE) under several loss functions. We show that at large but finite sample size, sample cross-correlation filtered by RIE estimators are often outperformed by HCE estimators for several of the loss functions. We also show that for block models and for hierarchically nested block models the best determination of the filtered sample cross-correlation is achieved by introducing two-step estimators combining state-of-the-art non-linear shrinkage models with hierarchical clustering estimators.
title Two-step estimators of high dimensional correlation matrices
topic Methodology
Physics and Society
url https://arxiv.org/abs/2212.14650