Weighted Extropy for Concomitants of Upper k-Record Values Based on Huang–Kotz Morgenstern of Bivariate Distribution

IF 0.7 Q2 MATHEMATICS Muenster Journal of Mathematics Pub Date : 2023-09-04 DOI:10.1155/2023/3423690
M. Nagy, Y. Tashkandy
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Abstract

In this paper, the marginal distribution of concomitants of k − record values (CKR) based on the Huang–Kotz Farlie–Gumbel–Morgenstern (HK-FGM) family of bivariate distributions is derived. In addition, we obtained the joint distribution of CKR for this family. Also, we obtained the hazard rate, reversed hazard rate, and residual life functions of CKR using the HK-FGM family. The weighted extropy and the weighted cumulative past extropy (WCPJ) are acquired for CKR under the HK-FGM family. In addition, we look into the issue of estimating the WCPJ by combining the empirical method with the concurrent use of KR in the HK-FGM family. Finally, we analyzed real-world data for illustration purposes, and the outcomes are rather striking.
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基于二元分布Huang-Kotz Morgenstern的上k记录值伴随物的加权熵
本文基于二元分布族(HK-FGM),导出了k -记录值(CKR)伴随子的边际分布。此外,我们还获得了该家族CKR的联合分布。此外,我们还利用HK-FGM家族获得了CKR的危害率、反向危害率和剩余寿命函数。在HK-FGM家族下,获得CKR的加权外向性和加权累积过去外向性(WCPJ)。此外,我们还研究了将经验方法与同时使用KR的HK-FGM家族相结合的WCPJ估计问题。最后,为了说明目的,我们分析了真实世界的数据,结果相当惊人。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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System Level Extropy of the Past Life of a Coherent System A New Proof of Rational Cycles for Collatz-Like Functions Using a Coprime Condition Adaptive Hierarchical Collocation Method for Solving Fractional Population Diffusion Model The Approximation of Generalized Log-Aesthetic Curves with G Weighted Extropy for Concomitants of Upper k-Record Values Based on Huang–Kotz Morgenstern of Bivariate Distribution
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