In this paper, we give an explanation to the failure of two likelihood ratio procedures for testing about covariance matrices from Gaussian populations when the dimension p is large compared to the sample size n. Next, using recent central limit theorems for linear spectral statistics of sample covariance matrices and of random F-matrices, we propose necessary corrections for these LR tests to cope with high-dimensional effects. The asymptotic distributions of these corrected tests under the null are given. Simulations demonstrate that the corrected LR tests yield a realized size close to nominal level for both moderate p (around 20) and high dimension, while the traditional LR tests with χ 2 approximation fails. Another contribution from t...
Many applications of modern science involve a large number of parameters. In many cases, the ...
52 pp. More covariance formulas are provided in section 4.2.International audienceIn this paper, the...
This paper constructs a new estimator for large covariance matrices by drawing a bridge between the ...
26 pages, 2 figures and 3 tables.International audienceIn this paper, we give an explanation to the ...
In this work, we redefined two important statistics, the CLRT test [Z. Bai, D. Jiang, J. Yao, S. Zhe...
In this paper, we establish the central limit theorem (CLT) for linear spectral statistics (LSS) of ...
This thesis is concerned about statistical inference for the population covariance matrix in the hig...
We investigate the likelihood ratio test for a large block-diagonal covariance matrix with an increa...
This paper considers testing a covariance matrix Σ in the high dimensional setting where the dimensi...
In this thesis we shall consider sample covariance matrices Sn in the case when the dimension of the...
In this paper, we propose corrections to the likelihood ratio test and John’s test for sphericity in...
In this paper, new tests for the independence of two high-dimensional vectors are investigated. We c...
Test statistics for sphericity and identity of the covariance matrix are presented, when the data ar...
This paper analyzes whether standard covariance matrix tests work whendimensionality is large, and i...
This thesis is concerned with finding the asymptotic distributions of linear spectral statistics of ...
Many applications of modern science involve a large number of parameters. In many cases, the ...
52 pp. More covariance formulas are provided in section 4.2.International audienceIn this paper, the...
This paper constructs a new estimator for large covariance matrices by drawing a bridge between the ...
26 pages, 2 figures and 3 tables.International audienceIn this paper, we give an explanation to the ...
In this work, we redefined two important statistics, the CLRT test [Z. Bai, D. Jiang, J. Yao, S. Zhe...
In this paper, we establish the central limit theorem (CLT) for linear spectral statistics (LSS) of ...
This thesis is concerned about statistical inference for the population covariance matrix in the hig...
We investigate the likelihood ratio test for a large block-diagonal covariance matrix with an increa...
This paper considers testing a covariance matrix Σ in the high dimensional setting where the dimensi...
In this thesis we shall consider sample covariance matrices Sn in the case when the dimension of the...
In this paper, we propose corrections to the likelihood ratio test and John’s test for sphericity in...
In this paper, new tests for the independence of two high-dimensional vectors are investigated. We c...
Test statistics for sphericity and identity of the covariance matrix are presented, when the data ar...
This paper analyzes whether standard covariance matrix tests work whendimensionality is large, and i...
This thesis is concerned with finding the asymptotic distributions of linear spectral statistics of ...
Many applications of modern science involve a large number of parameters. In many cases, the ...
52 pp. More covariance formulas are provided in section 4.2.International audienceIn this paper, the...
This paper constructs a new estimator for large covariance matrices by drawing a bridge between the ...