We generalize signed rank statistics to dimensions higher than one. This results in a class of orthogonally invariant and distribution free tests that can be used for testing spherical symmetry/location parameter. The corresponding estimator is orthogonally equivariant. Both the test and estimator can be chosen with asymptotic efficiency 1. The breakdown point of the estimator depends only on the scores, not on the dimension of the data. For elliptical distributions, we obtain an affine invariant test with the same asymptotic properties, if the signed rank statistic is applied to standardized data. We also present a method for computing the estimator numerically, and consider a real data example and some simulations. Finally, an application...
We present a nonparametric approach for testing Gaussianity of stationary signals. We consider testi...
We tackle the classical two-sample spherical location problem for directional data by having recours...
We consider a test for spherical symmetry of a distribution in dwith an unknown center. It is a mult...
Abstract. We generalize signed rank statistics to dimensions higher than one. This results in a clas...
We generalize signed rank statistics to dimensions higher than one. This results in a class of ortho...
AbstractFor a general class of unipolar, rotationally symmetric distributions on the multi-dimension...
The classical univariate sign and signed rank tests for location have been extended over the years t...
Multivariate sign tests attracted several statisticians in the past, and it is evident from recent n...
For a general class of unipolar, rotationally symmetric distributions on the multi-dimensional unit ...
This paper mainly focuses on one of the most classical testing problems in directional statistics, n...
Nonparametric procedures for testing and estimation of the shape matrix in the case of multivariate ...
AbstractThe so-called independent component (IC) model states that the observed p-vector X is genera...
AbstractA general class of optimal and distribution-free rank tests for the two-sample modal directi...
AbstractWe develop optimal rank-based procedures for testing affine-invariant linear hypotheses on t...
We propose new data driven score rank tests for univariate symmetry about an unknown center. We con...
We present a nonparametric approach for testing Gaussianity of stationary signals. We consider testi...
We tackle the classical two-sample spherical location problem for directional data by having recours...
We consider a test for spherical symmetry of a distribution in dwith an unknown center. It is a mult...
Abstract. We generalize signed rank statistics to dimensions higher than one. This results in a clas...
We generalize signed rank statistics to dimensions higher than one. This results in a class of ortho...
AbstractFor a general class of unipolar, rotationally symmetric distributions on the multi-dimension...
The classical univariate sign and signed rank tests for location have been extended over the years t...
Multivariate sign tests attracted several statisticians in the past, and it is evident from recent n...
For a general class of unipolar, rotationally symmetric distributions on the multi-dimensional unit ...
This paper mainly focuses on one of the most classical testing problems in directional statistics, n...
Nonparametric procedures for testing and estimation of the shape matrix in the case of multivariate ...
AbstractThe so-called independent component (IC) model states that the observed p-vector X is genera...
AbstractA general class of optimal and distribution-free rank tests for the two-sample modal directi...
AbstractWe develop optimal rank-based procedures for testing affine-invariant linear hypotheses on t...
We propose new data driven score rank tests for univariate symmetry about an unknown center. We con...
We present a nonparametric approach for testing Gaussianity of stationary signals. We consider testi...
We tackle the classical two-sample spherical location problem for directional data by having recours...
We consider a test for spherical symmetry of a distribution in dwith an unknown center. It is a mult...