Results 1 to 10 of about 145 (89)
WITHDRAWN: Cumulative residual extropy of minimum ranked set sampling with unequal samples [PDF]
Results in Applied Mathematics, 2021 The Publisher regrets that this article is an accidental duplication of an article that has already been published in RINAM, volume 10 (2021) 100156, http://dx.doi.org/10.1016/j.rinam.2021.100156.
Mohammad Reza Kazemi +3 more
doaj +5 more sources
A Generalized Measure of Cumulative Residual Entropy. [PDF]
Entropy (Basel), 2022 In this work, we introduce a generalized measure of cumulative residual entropy and study its properties. We show that several existing measures of entropy, such as cumulative residual entropy, weighted cumulative residual entropy and cumulative residual
Kattumannil SK +2 more
europepmc +2 more sources
Inference for a Kavya-Manoharan Inverse Length Biased Exponential Distribution under Progressive-Stress Model Based on Progressive Type-II Censoring. [PDF]
Entropy (Basel), 2022 In this article, a new one parameter survival model is proposed using the Kavya–Manoharan (KM) transformation family and the inverse length biased exponential (ILBE) distribution.
Alotaibi N +5 more
europepmc +2 more sources
On weighted cumulative residual extropy and weighted negative cumulative extropy
Statistics, 2022 In this paper, we define general weighted cumulative residual extropy (GWCRJ) and general weighted negative cumulative extropy (GWNCJ). We obtain its simple estimators for complete and right censored data. We obtain some results on GWCREJ and GWNCJ. We establish its connection to reliability theory and coherent systems.
Gupta, Nitin +2 more
core +4 more sources
Journal of Mathematics, 2022 In this paper, we study the extropy for concomitants of m−generalized order statistics (m−GOSs) from Huang–Kotz–Farlie–Gumbel–Morgenstern (HK-FGM) bivariate distribution.
I. A. Husseiny, A. H. Syam
doaj +2 more sources
Journal of Mathematics, 2023 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.
M. Nagy, Yusra A. Tashkandy
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Cumulative residual extropy of minimum ranked set sampling with unequal samples
Results in Applied Mathematics, 2021 Recently, an alternative measure of uncertainty called cumulative residual extropy (CREX) was proposed by Jahanshahi et al. (2019). In this paper, we consider uncertainty measures of minimum ranked set sampling procedure with unequal samples (MinRSSU) in
M.R. Kazemi +3 more
doaj +5 more sources
Analyzing the cumulative residual extropy of system inactivity times and revealing system complexity
Journal of Inequalities and ApplicationsIn this paper, we adopt a theoretical framework rooted in information theory, specifically focusing on cumulative residual extropy, to examine and contrast the times of system inactivity across multiple setups.
Zohreh Pakdaman, Reza Alizadeh Noughabi
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Fractal and FractionalThe complementary dual of entropy has received significant attention in the literature. Due to the emergence of many generalizations and extensions of entropy, the need to generalize the complementary dual of uncertainty arose.
Mohamed Said Mohamed, Hanan H. Sakr
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Non-parametric estimation of cumulative (residual) extropy
Statistics & Probability Letters, 2022 Extropy and its properties are explored to quantify the uncertainty. In this paper, we obtain alternative expressions for cumulative residual extropy and negative cumulative extropy. We obtain simple estimators of cumulative (residual) extropy. Asymptotic properties of the proposed estimators are studied.
Sudheesh K. Kattumannil, Sreedevi E.P.
openaire +2 more sources