Recently, Verdebout (2015) introduced a Kruskal–Wallis type rank-based procedure ϕV (n) to test the homogeneity of concentrations of some distributions on the unit hypersphere Sp−1 of Rp. While the asymptotic properties of ϕV (n) are known under the null hypothesis, nothing is known about its behavior under local alternatives. In this paper we compute the asymptotic relative efficiency of ϕV (n) with respect to the optimal Fisher–von Mises (FvM) score test ϕWJ (n) of Watamori and Jupp (2005) in the FvM case. Quite surprisingly we obtain that in the vicinity of the uniform distribution of S2, ϕV (n) and ϕWJ (n) do perform almost equally well. This implies that the natural robustness of ϕV (n) that comes from the use of ranks has no asymptoti...
AbstractIn this paper, we consider (mid-)rank based inferences for testing hypotheses in a fully non...
In this paper, we consider (mid-)rank based inferences for testing hypotheses in a fully nonparametr...
This thesis addresses a significant problem in numerous scientific fields - the challenge of determi...
In this paper we tackle the problem of testing the homogeneity of concentrations for directional dat...
We propose a class of locally and asymptotically optimal tests, based on multivariate ranks and sign...
One-sample and multi-sample tests on the concentration parameter of Fisher-von Mises-Langevin distri...
Rotationally symmetric distributions on the unit hyperpshere are among the most commonly met in dire...
We consider asymptotic inference for the concentration of directional data. More precisely, wepropos...
peer reviewedOne-sample and multi-sample tests on the concentration parameter of Fisher-von Mises-La...
There are at least two reasons for a symmetric, unimodal, diffuse tailed hyperbolic secant distribut...
We consider the problem of detecting unobserved heterogeneity, that is, the problem of testing the a...
We are deriving optimal rank-based tests for the adequacy of a vector autoregressive-moving average ...
This paper provides optimal testing procedures for the m-sample null hypothesis of Common Principal ...
cCentER, Tilburg University, and dDépartement de Mathématique, Universite ́ Libre de Bruxelles. We...
summary:The problem of testing hypothesis of randomness against a group of alternatives of regressio...
AbstractIn this paper, we consider (mid-)rank based inferences for testing hypotheses in a fully non...
In this paper, we consider (mid-)rank based inferences for testing hypotheses in a fully nonparametr...
This thesis addresses a significant problem in numerous scientific fields - the challenge of determi...
In this paper we tackle the problem of testing the homogeneity of concentrations for directional dat...
We propose a class of locally and asymptotically optimal tests, based on multivariate ranks and sign...
One-sample and multi-sample tests on the concentration parameter of Fisher-von Mises-Langevin distri...
Rotationally symmetric distributions on the unit hyperpshere are among the most commonly met in dire...
We consider asymptotic inference for the concentration of directional data. More precisely, wepropos...
peer reviewedOne-sample and multi-sample tests on the concentration parameter of Fisher-von Mises-La...
There are at least two reasons for a symmetric, unimodal, diffuse tailed hyperbolic secant distribut...
We consider the problem of detecting unobserved heterogeneity, that is, the problem of testing the a...
We are deriving optimal rank-based tests for the adequacy of a vector autoregressive-moving average ...
This paper provides optimal testing procedures for the m-sample null hypothesis of Common Principal ...
cCentER, Tilburg University, and dDépartement de Mathématique, Universite ́ Libre de Bruxelles. We...
summary:The problem of testing hypothesis of randomness against a group of alternatives of regressio...
AbstractIn this paper, we consider (mid-)rank based inferences for testing hypotheses in a fully non...
In this paper, we consider (mid-)rank based inferences for testing hypotheses in a fully nonparametr...
This thesis addresses a significant problem in numerous scientific fields - the challenge of determi...