Sums, products, and ratios for the bivariate Gumbel distribution
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Publication:815361
DOI10.1016/j.mcm.2005.02.003zbMath1084.60009OpenAlexW2007223367MaRDI QIDQ815361
Publication date: 16 February 2006
Published in: Mathematical and Computer Modelling (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.mcm.2005.02.003
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Cites Work
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- Some properties of bivariate Gumbel type a distributions with proportional hazard rates
- A method of combining multiple probabilistic classifiers through soft competition on different feature sets
- A Bayesian bivariate failure time regression model.
- The exact density function of the ratio of two dependent linear combinations of chi-square variables
- Testing equality of cause-specific hazard rates corresponding to \(m\) competing risks among \(K\) groups
- Control charts based on weighted sums
- The product and quotient of general beta distributions
- Exact moments of a ratio of two positive quadratic forms in normal variables
- Multivariate distributions involving ratios of normal variables
- Inferences Concerning the Mean of the Gamma Distribution
- The Locally Optimal Combination of Independent Test Statistics
- Distribution of the linear combination of two general beta variables and applications
- Bayesian analysis of the difference of two proportions
- Distributions of the ratios of independent beta variables and applications
- Distribution and moments of the weighted sum of uniforms random variables, with applications in reducing monte carlo simulations
- Some two Sample Tests
- Distribution of the Ratio of the Mean Square Successive Difference to the Variance
- A Two-Sample Test for a Linear Hypothesis Whose Power is Independent of the Variance
