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Abstract
This paper deals with the extended generalized inverse Gaussian (EGIG) distribution which has more than one turning point of the failure rate for certain values of the parameters. The EGIG model is a versatile model for analysing lifetime data and has one additional parameter, δ, than the GIG model's three parameters [B. Jorgensen, Statistical Properties of the Generalized Inverse Gaussian Distribution, Springer-Verlag, New York, 1982]. For the EGIG model, the maximum-likelihood estimation of the four parameters is discussed and a score test is developed for testing the importance of the additional parameter, δ. A non-central chi-square approximation to the power of the score test is provided. Simulation studies are carried out to examine the performance of the score test and the Wald confidence intervals. Finally, an example discussed by Jorgensen [5] is provided to illustrate that the EGIG model fits the data better than the GIG of Jorgensen [5]. Three other examples are presented and the power comparisons are displayed for each.
Acknowledgements
The authors are thankful to the reviewers for some useful comments which enhanced the presentation.