peer reviewedA classical characterization result, which can be traced back to Gauss, states that the maximum likelihood estimator (MLE) of the location parameter equals the sample mean for any possible univariate samples of any possible sizes n if and only if the samples are drawn from a Gaussian population. A similar result, in the two-dimensional case, is given in von Mises (1918) for the Fisher-von Mises-Langevin (FVML) distribution, the equivalent of the Gaussian law on the unit circle. Half a century later, Bingham and Mardia (1975) extend the result to FVML distributions on the unit sphere (Formula Presented.), k ≥ 2. In this paper, we present a general MLE characterization theorem for a large subclass of rotationally symmetric distri...
summary:The paper deals with two Mises distributions on the circle with unknown mean directions and ...
AbstractFor a general class of unipolar, rotationally symmetric distributions on the multi-dimension...
peer reviewedOne-sample and multi-sample tests on the concentration parameter of Fisher-von Mises-La...
peer reviewedMost commonly used distributions on the unit hypersphere Sk−1={v∈Rk:v⊤v=1}, k≥2, assume...
Most commonly used distributions on the unit hypersphere Sk−1={v∈Rk:v⊤v=1}, k≥2, assume that the dat...
The von Mises-Fisher (vMF) distribution has long been a mainstay for inference with data on the unit...
AbstractFor the problem of estimating under squared error loss the location parameter of a p-variate...
Motivated by the fact that circular or spherical data are often much concentrated around a location ...
We formulate a class of angular Gaussian distributions that allows different degrees of isotropy for...
For the problem of estimating under squared error loss the location parameter of a p-variate spheric...
Abstract We introduce some new classes of unimodal rotational invariant directional distributions, ...
In this paper, we provide R-estimators of the location of a rotationally symmetric distribution on t...
Motivated by the central role played by rotationally symmetric distributions in directional statisti...
In this paper, we provide R-estimators of the location of a rotationally symmetric distribution on t...
We define a distribution on the unit sphere Sd−1 called the elliptically symmetric angular Gaussian...
summary:The paper deals with two Mises distributions on the circle with unknown mean directions and ...
AbstractFor a general class of unipolar, rotationally symmetric distributions on the multi-dimension...
peer reviewedOne-sample and multi-sample tests on the concentration parameter of Fisher-von Mises-La...
peer reviewedMost commonly used distributions on the unit hypersphere Sk−1={v∈Rk:v⊤v=1}, k≥2, assume...
Most commonly used distributions on the unit hypersphere Sk−1={v∈Rk:v⊤v=1}, k≥2, assume that the dat...
The von Mises-Fisher (vMF) distribution has long been a mainstay for inference with data on the unit...
AbstractFor the problem of estimating under squared error loss the location parameter of a p-variate...
Motivated by the fact that circular or spherical data are often much concentrated around a location ...
We formulate a class of angular Gaussian distributions that allows different degrees of isotropy for...
For the problem of estimating under squared error loss the location parameter of a p-variate spheric...
Abstract We introduce some new classes of unimodal rotational invariant directional distributions, ...
In this paper, we provide R-estimators of the location of a rotationally symmetric distribution on t...
Motivated by the central role played by rotationally symmetric distributions in directional statisti...
In this paper, we provide R-estimators of the location of a rotationally symmetric distribution on t...
We define a distribution on the unit sphere Sd−1 called the elliptically symmetric angular Gaussian...
summary:The paper deals with two Mises distributions on the circle with unknown mean directions and ...
AbstractFor a general class of unipolar, rotationally symmetric distributions on the multi-dimension...
peer reviewedOne-sample and multi-sample tests on the concentration parameter of Fisher-von Mises-La...