The Gradient Test: Another Likelihood-Based Test presents the latest on the gradient test, a large-sample test that was introduced in statistics literature by George R. Terrell in 2002. The test has been studied by several authors, is simply computed, and can be an interesting alternative to the classical large-sample tests, namely, the likelihood ratio (LR), Wald (W), and Rao score (S) tests.
Due to the large literature about the LR, W and S tests, the gradient test is not frequently used to test hypothesis. The book covers topics on the local power of the gradient test, the Bartlett-corrected gradient statistic, the gradient statistic under model misspecification, and the robust gradient-type bounded-influence test.
- Covers the background of the gradient statistic and the different models
- Discusses The Bartlett-corrected gradient statistic
- Explains the algorithm to compute the gradient-type statistic
1 The gradient statistic? 2 The local power of the gradient test 3 The Bartlett-corrected gradient statistic 4 The gradient statistic under model misspecification 5 The robust gradient-type bounded-influence test
Provides a fast dissemination of the gradient test in statistics literature from around the world, presenting the latest information on this interesting alternative to the classical large-sample tests, namely the likelihood ratio (LR), Wald (W), and Rao score (S) tests
Artur J. Lemonte is a professor at Federal University of Pernambuco, Department of Statistics, Recife/PE, Brazil. He works on higher order asymptotics, mathematical statistics, regression models, parametric inference, and distribution theory. In the last years, he has published more than 60 papers in refereed
statistical journals (most of them about the gradient test).
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