Given a random sample of observations, mixtures of normal densities are often used to estimate the unknown continuous distribution from which the data come. Here we propose the use of this semiparametric framework for testing symmetry about an unknown value. More precisely, we show how the null hypothesis of symmetry may be formulated in terms of normal mixture model, with weights about the centre of symmetry constrained to be equal one another. The resulting model is nested in a more general unconstrained one, with same number of mixture components and free weights. Therefore, after having maximised the constrained and unconstrained log-likelihoods by means of a suitable algorithm, such as the Expectation-Maximisation, symmetry is tested a...
A procedure, based on sample spacings, is proposed for testing whether a univariate distribution is ...
Abstract: A finite mixture of normal distributions in both mean and variance pa-rameters is a typica...
If the univariate random variable X follows the distribution with distribution function F, then so d...
When testing symmetry of a univariate density, (parametric classes of) densities skewed by means of ...
When testing symmetry of a univariate density, (parametric classes of) densities skewed by means of ...
Being able to formally test for symmetry hypotheses is an important topic in many fields, including ...
We propose and study a general class of tests for group symmetry of a multivariate distribution, whi...
We consider in this paper the semiparametric mixture of two distributions equal up to a shift parame...
. Testing symmetry of a univariate distribution has been received much attention. Aki (1993) propose...
The assumption of the symmetry of the underlying distribution is important to many statistical infer...
We introduce the characteristic symmetry function, based on the characteristic function of the under...
We consider the problem of detecting sparse heterogeneous mixtures from a nonparametric perspective,...
It is important to examine the symmetry of an underlying distribution before applying some statistic...
In this paper, we introduce a new nonparametric test of symmetry based on the empirical overlap coef...
We derive nonparametric tests of symmetry using asymmetric kernels with either vanishing or fixed ba...
A procedure, based on sample spacings, is proposed for testing whether a univariate distribution is ...
Abstract: A finite mixture of normal distributions in both mean and variance pa-rameters is a typica...
If the univariate random variable X follows the distribution with distribution function F, then so d...
When testing symmetry of a univariate density, (parametric classes of) densities skewed by means of ...
When testing symmetry of a univariate density, (parametric classes of) densities skewed by means of ...
Being able to formally test for symmetry hypotheses is an important topic in many fields, including ...
We propose and study a general class of tests for group symmetry of a multivariate distribution, whi...
We consider in this paper the semiparametric mixture of two distributions equal up to a shift parame...
. Testing symmetry of a univariate distribution has been received much attention. Aki (1993) propose...
The assumption of the symmetry of the underlying distribution is important to many statistical infer...
We introduce the characteristic symmetry function, based on the characteristic function of the under...
We consider the problem of detecting sparse heterogeneous mixtures from a nonparametric perspective,...
It is important to examine the symmetry of an underlying distribution before applying some statistic...
In this paper, we introduce a new nonparametric test of symmetry based on the empirical overlap coef...
We derive nonparametric tests of symmetry using asymmetric kernels with either vanishing or fixed ba...
A procedure, based on sample spacings, is proposed for testing whether a univariate distribution is ...
Abstract: A finite mixture of normal distributions in both mean and variance pa-rameters is a typica...
If the univariate random variable X follows the distribution with distribution function F, then so d...