Some parametric models on the simplex

The paper deals with simple and composite hypotheses in statistical models with i.i.d. observations and with arbitrary families dominated by \_-finite measures and parametrized by vector-valued variables. It introduces ,-divergence testing statistics as alternatives to the classical ones: the genera

Recently, commentators have suggested that the distributional form of cost data should be explicitly modelled to gain efficiency in estimating the population mean. We perform a series of simulation experiments to evaluate the usual sample mean and the mean estimator of a lognormal distribution, in t

We shall prove that a convex body in R d (d/> 2) is a simplex if, and only if, each of its Steiner symmetrals is a convex double cone over the symmetrization space or, equivalently, has exactly two extreme points outside of this hyperplane. In I-3] it is shown that every Steiner symmetral of an arbi

Nonparametric statistical analyses of rodent carcinogenicity experiments involving occult tumours of intermediate lethality require numerous interim sacrifices. In recent papers, various semi-parametric analyses have been proposed which specify a parametric relationship between.the death rate in tum

In this paper we investigate nonstationary stochastic processes that are characterized by temporal-and spectral-domain parameters with the aim of determining when temporal and spectral parameterizations exist simultaneously. We begin by examining the large class of purely nondeterministic nonstation