Showing total 4 results

1. Adjusted Likelihood Inference in an Elliptical Multivariate Errors-in-Variables Model.

Author

Melo, Tatiane F. N. and Ferrari, Silvia L. P.

Subjects

MULTIVARIATE analysis, INFERENTIAL statistics, ERRORS-in-variables models, REGRESSION analysis, MATHEMATICAL models

Abstract

In this paper, we obtain an adjusted version of the likelihood ratio (LR) test for errors-in-variables multivariate linear regression models. The error terms are allowed to follow a multivariate distribution in the class of the elliptical distributions, which has the multivariate normal distribution as a special case. We derive a modifiedLRstatistic that follows a chi-squared distribution with a high degree of accuracy. Our results generalize those in Melo and Ferrari (Advances in Statistical Analysis, 2010,94, pp. 75–87) by allowing the parameter of interest to be vector-valued in the multivariate errors-in-variables model. We report a simulation study which shows that the proposed test displays superior finite sample behavior relative to the standardLRtest. [ABSTRACT FROM PUBLISHER]

Published

2014

2. Multivariate log-Birnbaum–Saunders regression models.

Author

Martínez-Flórez, Guillermo, Farias, Rafael Bráz Azevedo, and Moreno-Arenas, Germán

Subjects

MULTIVARIATE analysis, REGRESSION analysis, MAXIMUM likelihood statistics, PARAMETER estimation, MATRICES (Mathematics)

Abstract

In this paper, we present a multivariate version of the skewed log-Birnbaum–Saunders regression model. This new family of distributions holds good properties such as marginal variables following univariate skewed log-Birnbaum–Saunders distributions, besides presenting the usual log-Birnbaum–Saunders distribution as a particular case. Furthermore, the model parameters are estimated through maximum-likelihood methods, a closed-form expression for the Fisher’s information matrix is presented, and testing hypothesis for model parameters is performed. Two real datasets are analyzed and results are discussed. [ABSTRACT FROM AUTHOR]

Published

2017

3. Estimation and hypothesis testing in multivariate linear regression models under non normality.

Author

Islam, M. Qamarul

Subjects

REGRESSION analysis, ESTIMATION theory, STATISTICAL hypothesis testing, INFERENTIAL statistics, MULTIVARIATE analysis, LEAST squares

Abstract

This paper discusses the problem of statistical inference in multivariate linear regression models when the errors involved are non normally distributed. We consider multivariatet-distribution, a fat-tailed distribution, for the errors as alternative to normal distribution. Such non normality is commonly observed in working with many data sets, e.g., financial data that are usually having excess kurtosis. This distribution has a number of applications in many other areas of research as well. We use modified maximum likelihood estimation method that provides the estimator, called modified maximum likelihood estimator (MMLE), in closed form. These estimators are shown to be unbiased, efficient, and robust as compared to the widely used least square estimators (LSEs). Also, the tests based upon MMLEs are found to be more powerful than the similar tests based upon LSEs. [ABSTRACT FROM PUBLISHER]

Published

2017

4. Multivariate normal estimation: the case (n < p).

Author

Strydom, Nina and Crowther, Nico

Subjects

MULTIVARIATE analysis, MAXIMUM likelihood statistics, CONSTRAINT algorithms, COVARIANCE matrices, REGRESSION analysis

Abstract

Estimation in the multivariate context when the number of observations available is less than the number of variables is a classical theoretical problem. In order to ensure estimability, one has to assume certain constraints on the parameters. A method for maximum likelihood estimation under constraints is proposed to solve this problem. Even in the extreme case where only a single multivariate observation is available, this may provide a feasible solution. It simultaneously provides a simple, straightforward methodology to allow for specific structures within and between covariance matrices of several populations. This methodology yields exact maximum likelihood estimates. [ABSTRACT FROM AUTHOR]

Published

2018