Add to ORKGThe Wald, likelihood ratio and Lagrange multiplier test statistics are commonly used to test linear restrictions in regression models. It is shown that for testing these restrictions in the classical regression model, the exact densities of these test statistics are special cases of the generalized beta distribution introduced by McDonald (1984); McDonald and Xu (1995a). This unified derivation provides a method by which one can derive small sample critical values for each test. These results may be indicative of the behavior of such test statistics in more general settings, and are useful in visualizing how each statistic changes with different parameter values in the simple regression model. For example, the results suggest that Wald test...
This paper extends earlier results, which were reported in [7], to include non null distributions. A...
Tests are developed for inference on a parameter vector whose dimension grows slowly with sample siz...
Tests are developed for inference on a parameter vector whose dimension grows slowly with sample siz...
The Wald, likelihood ratio and Lagrange multiplier test statistics are commonly used to test linear ...
Under the maximum likelihood framework, three asymptotic overall tests have been well developed in g...
This paper discusses some issues related to the use of the Lagrange multiplier, likelihood ratio and...
This paper derives the exact distribution of the Wald statistic for testing general linear restricti...
This paper derives the exact distribution of the Wald statistic for testing general linear restricti...
This paper is concerned with testing linear hypotheses in high dimensional generalized linear models...
Abstract. Technical and conceptual advances in testing multivariate linear and non-linear inequality...
We show that three convenient statistical properties that are known to hold forthe linear model with...
An alternative Wald type test called the quel test is developed for two linear restrictions by findi...
The properties of the bootstrap test for restrictions are studied in two versions: 1) bootstrapping ...
The question of testing for equality in distribution between two linear models, each consisting of s...
This paper extends earlier results, which were reported in [7], to include non null distributions. A...
This paper extends earlier results, which were reported in [7], to include non null distributions. A...
Tests are developed for inference on a parameter vector whose dimension grows slowly with sample siz...
Tests are developed for inference on a parameter vector whose dimension grows slowly with sample siz...
The Wald, likelihood ratio and Lagrange multiplier test statistics are commonly used to test linear ...
Under the maximum likelihood framework, three asymptotic overall tests have been well developed in g...
This paper discusses some issues related to the use of the Lagrange multiplier, likelihood ratio and...
This paper derives the exact distribution of the Wald statistic for testing general linear restricti...
This paper derives the exact distribution of the Wald statistic for testing general linear restricti...
This paper is concerned with testing linear hypotheses in high dimensional generalized linear models...
Abstract. Technical and conceptual advances in testing multivariate linear and non-linear inequality...
We show that three convenient statistical properties that are known to hold forthe linear model with...
An alternative Wald type test called the quel test is developed for two linear restrictions by findi...
The properties of the bootstrap test for restrictions are studied in two versions: 1) bootstrapping ...
The question of testing for equality in distribution between two linear models, each consisting of s...
This paper extends earlier results, which were reported in [7], to include non null distributions. A...
This paper extends earlier results, which were reported in [7], to include non null distributions. A...
Tests are developed for inference on a parameter vector whose dimension grows slowly with sample siz...
Tests are developed for inference on a parameter vector whose dimension grows slowly with sample siz...