Asymptotic random extremal ratio and product based on generalized order statistics and its dual |
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| Authors: | M. A. Alawady A. M. Elsawah Jianwei Hu Hong Qin |
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| Affiliation: | 1. Faculty of Mathematics and Statistics, Central China Normal University, Wuhan, China;2. Department of Mathematics, Faculty of Science, Zagazig University, Zagazig, Egypt;3. Division of Science and Technology, BNU-HKBU United International College, Zhuhai, China |
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| Abstract: | The extremal ratio has been used in several fields, most notably in industrial quality control, life testing, small-area variation analysis, and the classical heterogeneity of variance situation. In many biological, agricultural, military activity problems and in some quality control problems, it is almost impossible to have a fixed sample size, because some observations are always lost for various reasons. Therefore, the sample size itself is considered frequently to be an random variable (rv). Generalized order statistics (GOS) have been introduced as a unifying theme for several models of ascendingly ordered rvs. The concept of dual generalized order statistics (DGOS) is introduced to enable a common approach to descendingly ordered rvs. In this article, the limit dfs are obtained for the extremal ratio and product with random indices under non random normalization based on GOS and DGOS. Moreover, this article considers the conditions under which the cases of random and non random indices give the same asymptotic results. Some illustrative examples are obtained, which lend further support to our theoretical results. |
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| Keywords: | Dual generalized order statistics Extremal product Extremal ratio Generalized order statistics Random indices Weak convergence |
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