TY - JOUR
T1 - Bayesian estimation of two-parameter Weibull distribution using extension of Jeffreys' prior information with three loss functions
AU - Guure, Chris Bambey
AU - Ibrahim, Noor Akma
AU - Ahmed, Al Omari Mohammed
PY - 2012
Y1 - 2012
N2 - The Weibull distribution has been observed as one of the most useful distribution, for modelling and analysing lifetime data in engineering, biology, and others. Studies have been done vigorously in the literature to determine the best method in estimating its parameters. Recently, much attention has been given to the Bayesian estimation approach for parameters estimation which is in contention with other estimation methods. In this paper, we examine the performance of maximum likelihood estimator and Bayesian estimator using extension of Jeffreys prior information with three loss functions, namely, the linear exponential loss, general entropy loss, and the square error loss function for estimating the two-parameter Weibull failure time distribution. These methods are compared using mean square error through simulation study with varying sample sizes. The results show that Bayesian estimator using extension of Jeffreys' prior under linear exponential loss function in most cases gives the smallest mean square error and absolute bias for both the scale parameter α and the shape parameter β for the given values of extension of Jeffreys' prior.
AB - The Weibull distribution has been observed as one of the most useful distribution, for modelling and analysing lifetime data in engineering, biology, and others. Studies have been done vigorously in the literature to determine the best method in estimating its parameters. Recently, much attention has been given to the Bayesian estimation approach for parameters estimation which is in contention with other estimation methods. In this paper, we examine the performance of maximum likelihood estimator and Bayesian estimator using extension of Jeffreys prior information with three loss functions, namely, the linear exponential loss, general entropy loss, and the square error loss function for estimating the two-parameter Weibull failure time distribution. These methods are compared using mean square error through simulation study with varying sample sizes. The results show that Bayesian estimator using extension of Jeffreys' prior under linear exponential loss function in most cases gives the smallest mean square error and absolute bias for both the scale parameter α and the shape parameter β for the given values of extension of Jeffreys' prior.
UR - http://www.scopus.com/inward/record.url?scp=84866153551&partnerID=8YFLogxK
U2 - 10.1155/2012/589640
DO - 10.1155/2012/589640
M3 - Article
AN - SCOPUS:84866153551
SN - 1024-123X
VL - 2012
JO - Mathematical Problems in Engineering
JF - Mathematical Problems in Engineering
M1 - 589640
ER -