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Modified Goodness-Of-Fit Tests For The Inverse Gaussian Distribution With TwoUnknown Parameter

机译：具有两个未知参数的逆高斯分布的修正拟合优度检验

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Modified Kolmogorov- Smirnov (KS), Anderson-Darling (AD), Cramer-von Mises (CV),Kupier (V), and Watson (W) goodness-of-fit tests are generated for the inverse Gaussian distribution with unknown parameters. The inverse Gaussian parameters are estimated by maximum likelihood estimation. A Monte Carlo simulation of 50,000 repetitions is used to generate critical values for sample sizes of 5 through 50 with an increment of five, sample sizes of 60 through 100 with an increment of 10, and 24 different values of the inverse Gaussian shape parameter. A 50,000-repetition Monte Carlo power study is carried out using data with sample sizes of 5 through 100 from five alternate distributions for the five EDF tests for significance levels of 0.01,0.05,0.10, 0.15, and 0.20. For sequential tests, power studies are performed for the significance levels produced by combining two EDF tests. Power studies corresponding two both cases are presented in tables and graphs. The power studies showed that the tests arc excellent in discriminating between the inverse Gaussian and distributions such as the gamma, exponential and uniform that are very different in shape. However, they are relatively unable to discriminate between the inverse Gaussian distribution and distributions that are similar in shape such as the lognormal and certain Weibull distributions with shape similar to the particular inverse Gaussian. The AD test has the highest power in most cases studied. A functional relationship is identified between the modified KS, AD, CV, V, and W test statistics, sample size, and the inverse Gaussian shape parameter. The critical values are found to be a non-linear function of the shape parameters and sample sizes for the significance levels of 0.01, 0.05, 0.10, 0.15, and 0.20.

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Guenes, H.;
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年度 1995
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总页数 339
原文格式 PDF
正文语种 eng
中图分类工业技术;
关键词
Inversion; Normal distribution; Goodness of fit tests; High power; Simulation; Weibull density functions; Parameters; Maximum likelihood estimation; Statistical tests; Graphs(Charts); Theses; Monte carlo method; Sequential analysis; Nonlinear systems; Pow;

机译：反演;正态分布;拟合优度检验;高功率;模拟;威布尔密度函数;参数;最大似然估计;统计检验;图（图表）;论文;蒙特卡罗方法;序贯分析;非线性系统; pow;

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1. Entropy estimation and goodness-of-fit tests for the inverse Gaussian and Laplace distributions using paired ranked set sampling [J] . Al-Omari Amer Ibrahim, Haq Abdul Journal of statistical computation and simulation . 2016,第10a12期

机译：高斯和拉普拉斯分布反演的熵估计和拟合优度检验
2. Modeling Statistic Distributions for Nonparametric Goodness-of-Fit Criteria for Testing Complex Hypotheses with Respect to the Inverse Gaussian Law [J] . B. Yu. Lemeshko, S. B. Lemeshko, M. S. Nikulin, Automation and Remote Control . 2010,第7期

机译：关于反高斯定律的复杂假设的非参数拟合优度标准的统计分布建模
3. Exact EDF Goodness-of-Fit Tests for Inverse Gaussian Distributions [J] . Truc T. Nguyen, Khoan T. Dinh Communications in Statistics. B, Simulation and Computation . 2003,第2期

机译：逆高斯分布的精确EDF拟合优度检验
4. Tests of Fit for Normal Variance Inverse Gaussian Distributions [C] . S. G. Meintanis World Congress on Engineering . 2008

机译：适用于正常方差逆高斯分布的测试
5. Accelerated test models using the inverse Gaussian distribution. [D] . Onar, Arzu. 1998

机译：使用逆高斯分布的加速测试模型。
6. Goodness-of-fit tests for the Compound Rayleigh distribution with application to real data [O] . Majdah M. Badr 2019

机译：复合瑞利分布的拟合优度检验及其在实际数据中的应用
7. A regression characterization of inverse Gaussian distributions and application to EDF goodness-of-fit tests [O] . Khoan T. Dinh, Nhu T. Nguyen, Truc T. Nguyen 2003

机译：逆高斯分布的回归表征并应用于EDF拟合优度检验

Modified Goodness-Of-Fit Tests For The Inverse Gaussian Distribution With TwoUnknown Parameter

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