Add to ORKGKendall’s tau and conditional Kendall’s tau matrices are multivariate (conditional) dependence measures between the components of a random vector. For large dimensions, available estimators are computationally expensive and can be improved by averaging. Under structural assumptions on the underlying Kendall’s tau and conditional Kendall’s tau matrices, we introduce new estimators that have a significantly reduced computational cost while keeping a similar error level. In the unconditional setting we assume that, up to reordering, the underlying Kendall’s tau matrix is block-structured with constant values in each of the off-diagonal blocks. The estimators take advantage of this block structure by averaging over (part of) the pairwise estima...
This paper proposes a new model for the dynamics of correlation matrices, where the dynamics are dri...
The traditional approach to multivariate extreme values has been through the multivariate extreme va...
We introduce a class of multiplicative dynamic models for realized covariance matrices assumed to be...
Conditional Kendall's tau is a measure of dependence between two random variables, conditionally on ...
We study nonparametric estimators of conditional Kendall's tau, a measure of concordance between two...
We study nonparametric estimators of conditional Kendall’s tau, a measure of concordance between two...
<div><p>In this article, we focus on estimation and test of conditional Kendall's tau under semi-com...
This paper deals with the problem of estimating the multivariate version of the Conditional-Tail-Exp...
The authors show how Kendall's tau can be adapted to test against serial dependence in a univariate ...
summary:Consistent estimators of the asymptotic covariance matrix of vectors of $U$-statistics are u...
The authors show how Kendall's tau can be adapted to test against serial dependence in a univariate ...
Correlation matrices play a key role in many multivariate methods (e.g., graphical model estimation ...
We propose a Kronecker product structure for large covariance or correlation matrices. One feature o...
We prove that Kendall’s Rank correlation matrix converges to the Marčenko Pastur law, under the assu...
This paper investigates limiting spectral distribution of a high-dimensional Kendall's rank correlat...
This paper proposes a new model for the dynamics of correlation matrices, where the dynamics are dri...
The traditional approach to multivariate extreme values has been through the multivariate extreme va...
We introduce a class of multiplicative dynamic models for realized covariance matrices assumed to be...
Conditional Kendall's tau is a measure of dependence between two random variables, conditionally on ...
We study nonparametric estimators of conditional Kendall's tau, a measure of concordance between two...
We study nonparametric estimators of conditional Kendall’s tau, a measure of concordance between two...
<div><p>In this article, we focus on estimation and test of conditional Kendall's tau under semi-com...
This paper deals with the problem of estimating the multivariate version of the Conditional-Tail-Exp...
The authors show how Kendall's tau can be adapted to test against serial dependence in a univariate ...
summary:Consistent estimators of the asymptotic covariance matrix of vectors of $U$-statistics are u...
The authors show how Kendall's tau can be adapted to test against serial dependence in a univariate ...
Correlation matrices play a key role in many multivariate methods (e.g., graphical model estimation ...
We propose a Kronecker product structure for large covariance or correlation matrices. One feature o...
We prove that Kendall’s Rank correlation matrix converges to the Marčenko Pastur law, under the assu...
This paper investigates limiting spectral distribution of a high-dimensional Kendall's rank correlat...
This paper proposes a new model for the dynamics of correlation matrices, where the dynamics are dri...
The traditional approach to multivariate extreme values has been through the multivariate extreme va...
We introduce a class of multiplicative dynamic models for realized covariance matrices assumed to be...