Marshall-Olkin generalized Erlang-truncated exponential distribution: Properties and applications

Autor:	Okorie, Idika, Akpanta, Anthony C., Ohakwe, Johnson
Jazyk:	angličtina
Rok vydání:	2017
Předmět:	Marshall-Olkin reliability lcsh:Mathematics AIC Erlang-truncated exponential distribution lcsh:QA1-939 failure rate
Zdroj:	Cogent Mathematics, Vol 4, Iss 1 (2017) Okorie, I, Akpanta, A C & Ohakwe, J 2017, ' Marshall-Olkin Generalized Erlang-truncated Exponential Distribution: Properties and Applications ', Cogent Mathematics . https://doi.org/10.1080/23311835.2017.1285093
ISSN:	2331-1835
DOI:	10.1080/23311835.2017.1285093
Popis:	This article introduces the Marshall–Olkin generalized Erlang-truncated exponential (MOGETE) distribution as a generalization of the Erlang-truncated exponential (ETE) distribution. The hazard rate of the new distribution could be increasing, decreasing or constant. Explicit-closed form mathematical expressions of some of the statistical and reliability properties of the new distribution were given and the method of maximum likelihood estimation was used to estimate the model parameters. The usefulness and flexibility of the new distribution was illustrated with two real and uncensored lifetime data-sets. The MOGETE distribution with a smaller goodness of fit statistics always emerged as a better candidate for the data-sets than the ETE, Exp Fréchet and Exp Burr XII distributions.
Databáze:	OpenAIRE
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