For the one-sample problem, a two-stage rank test is derived which realizes a required power against a given local alternative, for all sufficiently smooth underlying distributions. This is achieved using asymptotic expansions resulting in a precision of orderm −1, wherem is the size of the first sample. The size of the second sample is derived through a number of estimators of e. g. integrated squared densities and density derivatives, all based on the first sample. The resulting procedure can be viewed as a nonparametric analogue of the classical Stein's two-stage procedure, which uses at-test and assumes normality for the underlying distribution. The present approach also generalizes earlier work which extended the classical method to pa...
We study nonparametric estimation of an unknown density function f based on the ranked-based observa...
This paper develops an approach to rank testing that nests all existing rank tests and simplifies th...
Abstract: In the problem of testing equality of scale of two distributions a rank test should be pre...
In this paper we present a rank analogue to Stein's two-stage procedure. We analyze its behavior to ...
We propose a new nonparametric test for ordered alternative problem based on the rank difference bet...
In this paper several rank order statistics for the univariate two-sample testing problem are propos...
We propose a new nonparametric test for ordered alternative problem based on the rank difference bet...
AbstractA class of bivariate rank tests are developed for the two-sample problem of testing equality...
We study a nonparametric test procedure based on order statistics for testing the null hypothesis of...
This paper deals with a class of nonparametric two-sample tests for location, scale and more higher ...
[[abstract]]A test is presented for testing equality of two multivariate populations versus the alte...
Linear models with stable error densities are considered, and their local asymptotic normality with ...
A class of bivariate rank tests are developed for the two-sample problem of testing equality of dist...
To test if a density f is equal to a specified f0, one knows by the Neyman-Pearson lemma the form of...
We propose a new nonparametric test based on the rank difference between the paired sample for testi...
We study nonparametric estimation of an unknown density function f based on the ranked-based observa...
This paper develops an approach to rank testing that nests all existing rank tests and simplifies th...
Abstract: In the problem of testing equality of scale of two distributions a rank test should be pre...
In this paper we present a rank analogue to Stein's two-stage procedure. We analyze its behavior to ...
We propose a new nonparametric test for ordered alternative problem based on the rank difference bet...
In this paper several rank order statistics for the univariate two-sample testing problem are propos...
We propose a new nonparametric test for ordered alternative problem based on the rank difference bet...
AbstractA class of bivariate rank tests are developed for the two-sample problem of testing equality...
We study a nonparametric test procedure based on order statistics for testing the null hypothesis of...
This paper deals with a class of nonparametric two-sample tests for location, scale and more higher ...
[[abstract]]A test is presented for testing equality of two multivariate populations versus the alte...
Linear models with stable error densities are considered, and their local asymptotic normality with ...
A class of bivariate rank tests are developed for the two-sample problem of testing equality of dist...
To test if a density f is equal to a specified f0, one knows by the Neyman-Pearson lemma the form of...
We propose a new nonparametric test based on the rank difference between the paired sample for testi...
We study nonparametric estimation of an unknown density function f based on the ranked-based observa...
This paper develops an approach to rank testing that nests all existing rank tests and simplifies th...
Abstract: In the problem of testing equality of scale of two distributions a rank test should be pre...