ShrinkCovMat-package: Shrinkage Covariance Matrix Estimators
In AnestisTouloumis/ShrinkCovMat: Shrinkage Covariance Matrix Estimators
ShrinkCovMat-package R Documentation
Shrinkage Covariance Matrix Estimators
Description
Provides nonparametric Stein-type shrinkage estimators of the covariance
matrix that are suitable and statistically efficient when the number of
variables is larger than the sample size. These estimators are non-singular
and well-conditioned regardless of the dimensionality.
Details
Each of the implemented shrinkage covariance matrix estimators is a convex
linear combination of the sample covariance matrix and of a target matrix.
The function shrinkcovmat implements three options for the
target matrix: (a) spherical sample covariance matrix, i.e. the diagonal
matrix with diagonal elements the average of the sample variances, (b)
diagonal sample covariance matrix, i.e. the diagonal matrix with diagonal
elements the corresponding sample variances, and (c) the identity matrix
(identity). The optimal shrinkage intensity determines how much the
sample covariance matrix will be shrunk towards the selected target matrix.
Estimation of the corresponding optimal shrinkage intensities is discussed
in Touloumis (2015). The function targetselection is
designed to ease the selection of the target matrix.
Author(s)
Anestis Touloumis
Maintainer: Anestis Touloumis <A.Touloumis@brighton.ac.uk>
References
Touloumis, A. (2015) Nonparametric Stein-type Shrinkage
Covariance Matrix Estimators in High-Dimensional Settings.
Computational Statistics & Data Analysis 83, 251–261.
See Also
Useful links:
AnestisTouloumis/ShrinkCovMat documentation built on July 30, 2023, 7:38 a.m.
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| ShrinkCovMat-package | R Documentation |
Shrinkage Covariance Matrix Estimators
Description
Provides nonparametric Stein-type shrinkage estimators of the covariance matrix that are suitable and statistically efficient when the number of variables is larger than the sample size. These estimators are non-singular and well-conditioned regardless of the dimensionality.
Details
Each of the implemented shrinkage covariance matrix estimators is a convex linear combination of the sample covariance matrix and of a target matrix.
The function shrinkcovmat implements three options for the
target matrix: (a) spherical sample covariance matrix, i.e. the diagonal
matrix with diagonal elements the average of the sample variances, (b)
diagonal sample covariance matrix, i.e. the diagonal matrix with diagonal
elements the corresponding sample variances, and (c) the identity matrix
(identity). The optimal shrinkage intensity determines how much the
sample covariance matrix will be shrunk towards the selected target matrix.
Estimation of the corresponding optimal shrinkage intensities is discussed
in Touloumis (2015). The function targetselection is
designed to ease the selection of the target matrix.
Author(s)
Anestis Touloumis
Maintainer: Anestis Touloumis <A.Touloumis@brighton.ac.uk>
References
Touloumis, A. (2015) Nonparametric Stein-type Shrinkage Covariance Matrix Estimators in High-Dimensional Settings. Computational Statistics & Data Analysis 83, 251–261.
See Also
Useful links:
R Package Documentation
Browse R Packages
We want your feedback!
Note that we can't provide technical support on individual packages. You should contact the package authors for that.
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