Confidence Intervals for the Difference Between the Coefficients of Variation of Inverse Gaussian Distributions

Abstract

AbstractThe aim of this study is to propose confidence intervals for the difference between the coefficients of variation of inverse Gaussian distributions based on the generalized confidence interval (GCI), the adjusted generalized confidence interval (AGCI), the bootstrap percentile confidence interval (BPCI), and the method of variance estimates recovery (MOVER). The performances of the proposed confidence intervals were evaluated using coverage probabilities and average lengths via Monte Carlo simulation. The results showed that the GCI and AGCI methods were higher than or close to the nominal level in all cases. For small sample sizes, MOVER was better than the other methods because it provided the narrowest average length. The performances of all the approaches were illustrated using two real data examples.KeywordsBootstrapCoefficients of variationGeneralized confidence intervalInverse Gaussian distributionMethod of variance estimates recovery