Computing the exact distribution of the Bartlett's test statistic by numerical inversion of its characteristic function
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Publication:5861446
DOI10.1080/02664763.2019.1675608OpenAlexW2979558102WikidataQ127129673 ScholiaQ127129673MaRDI QIDQ5861446
Publication date: 1 March 2022
Published in: Journal of Applied Statistics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/02664763.2019.1675608
Multivariate distribution of statistics (62H10) Exact distribution theory in statistics (62E15) Applications of statistics (62Pxx)
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Uses Software
Cites Work
- A general near-exact distribution theory for the most common likelihood ratio test statistics used in multivariate analysis
- The distribution of the product of powers of independent uniform random variables -- a simple but useful tool to address and better understand the structure of some distributions
- Distributions of exact tests in the exponential family
- Exact critical values of Bartlett's test of homogeneity of variances for unequal sample sizes for two populations and power of the test
- The Fourier-series method for inverting transforms of probability distributions
- A comparison of some methods for the evaluation of highly oscillatory integrals
- Logarithmic Lambert \(W \times \mathcal{F}\) random variables for the family of chi-squared distributions and their applications
- Near-exact distributions for the likelihood ratio test statistic to test equality of several variance-covariance matrices in elliptically contoured distributions
- Inverting Analytic Characteristic Functions and Financial Applications
- Multi-precision Laplace transform inversion
- Testing Hypotheses about the Shape Parameter of a Gamma Distribution
- A User-Friendly Extrapolation Method for Oscillatory Infinite Integrals
- On the Exact Distribution of a Normalized Ratio of the Weighted Geometric Mean to the Unweighted Arithmetic Mean in Samples From Gamma Distributions
- On the Determination of Critical Values for Bartlett's Test
- Algorithm AS 155: The Distribution of a Linear Combination of χ 2 Random Variables
- Exact Critical Values for Bartlett's Test for Homogeneity of Variances
- The Ratio of the Geometric Mean to the Arithmetic Mean for a Random Sample from a Gamma Distribution
- The Accurate Numerical Inversion of Laplace Transforms
- On bartlett and bartlett-type corrections francisco cribari-neto
- A revisit to test the equality of variances of several populations
- The Numerical Evaluation of Very Oscillatory Infinite Integrals by Extrapolation
- A Note on Determining thep-Value of Bartlett's Test of Homogeneity of Variances
- An Adjustment to the Bartlett's Test for Small Sample Size
- Improved FFT approximations of probability functions based on modified quadrature rules
- Computing the distribution of quadratic forms in normal variables
- Properties of sufficiency and statistical tests
- Note on the inversion theorem
- On the exact computation of the density and of the quantiles of linear combinations of \(t\) and \(F\) random variables
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