Inference on Overlap for Two Inverse Gaussian Populations: Equal Means Case |
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| Authors: | Yogendra P. Chaubey Debaraj Sen Satya N. Mishra |
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| Affiliation: | 1. Department of Mathematics and Statistics , Concordia University , Montreal, Québec, Canada chaubey@alcor.concordia.ca;3. Department of Mathematics and Statistics , Concordia University , Montreal, Québec, Canada;4. Department of Mathematics and Statistics , University of South Alabama , Mobile, Alabama, USA |
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| Abstract: | ![]()
The inverse Gaussian distribution is often suited for modeling positive and/or positively skewed data (see Chhikara and Folks, 1989 Chhikara , R. S. , Folks , J. L. ( 1989 ). The Inverse Gaussian Distribution . New York : Marcel Dekker . [Google Scholar]) and presents an interesting alternative to the Gaussian model in such cases. We note here that overlap coefficients and their variants are widely studied in the literature for Gaussian populations (see Mulekar and Mishra, 1994 Mulekar , M. , Mishra , S. N. ( 1994 ). Overlap coefficients of two normal densities: equal means case . J. Japan. Statist. Soc. 24 : 169 – 180 . [Google Scholar], 2000 Mulekar , M. , Mishra , S. N. ( 2000 ). Confidence interval estimation of overlap: equal means case . Computat. Statist. Data Anal. 34 : 121 – 137 .[Crossref], [Web of Science ®] , [Google Scholar], and references therein for further details). This article studies the properties and addresses point estimation for large samples of commonly used measures of overlap when the populations are described by inverse Gaussian distributions. The bias and mean square error properties of the estimators are studied through a simulation study. |
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| Keywords: | Inverse Gaussian distribution Overlap coefficients Similarity measures |
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