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On the study of the recurrence relations and characterizations based on progressive first-failure censoring

Λεπτομέρειες βιβλιογραφικής εγγραφής
Τίτλος: On the study of the recurrence relations and characterizations based on progressive first-failure censoring
Συγγραφείς: Najwan Alsadat, Mahmoud H. Abu‐Moussa, Ali Sharawy
Πηγή: AIMS Mathematics, Vol 9, Iss 1, Pp 481-494 (2024)
Στοιχεία εκδότη: American Institute of Mathematical Sciences (AIMS), 2024.
Έτος έκδοσης: 2024
Θεματικοί όροι: Statistics and Probability, product moments, Social Sciences, Geometry, 02 engineering and technology, Sample size determination, 01 natural sciences, Mathematical analysis, Decision Sciences, Engineering, Skew Distributions and Applications in Statistics, QA1-939, 0202 electrical engineering, electronic engineering, information engineering, FOS: Mathematics, 0101 mathematics, Safety, Risk, Reliability and Quality, Exponentiated Weibull distribution, Censoring (clinical trials), Statistics, Exponential function, single moments, Recurrence relation, Applied mathematics, kmiwd, Reliability Engineering and Maintenance Optimization, Combinatorics, Physical Sciences, Uncertainty Quantification and Sensitivity Analysis, Exponential distribution, recurrence relations and characterizations, progressive first-failure censoring, Weibull distribution, Reliability Analysis, Statistics, Probability and Uncertainty, Inverse, Mathematics
Περιγραφή: In this research, the progressive first-failure censored data (PFFC) from the Kumaraswamy modified inverse-Weibull distribution (KMIWD) were used to obtain the recurrence relations and characterizations for single and product moments. The recurrence relationships allow for a rapid and efficient assessment of the means, variances and covariances for any sample size. Additionally, the paper outcomes can be boiled down to the traditional progressive type-II censoring. Also, some special cases are limited to some lifetime distributions as the exponentiated modified inverse Weibull and Kumaraswamy inverse exponential.
Τύπος εγγράφου: Article
Other literature type
ISSN: 2473-6988
DOI: 10.3934/math.2024026
DOI: 10.60692/qw5bd-fg376
DOI: 10.60692/0pe05-xet11
Σύνδεσμος πρόσβασης: https://doaj.org/article/7b161b7157ce4d9ebb61196e922535d8
Αριθμός Καταχώρησης: edsair.doi.dedup.....7ed47d788d7cd725b2e39f242ea6fd8f
Βάση Δεδομένων: OpenAIRE
Περιγραφή
ISSN:24736988
DOI:10.3934/math.2024026