Power unit inverse Lindley distribution with different measures of uncertainty, estimation and applications

This paper introduced and investigated the power unit inverse Lindley distribution (PUILD), a novel two -parameter generalization of the famous unit inverse Lindley distribution. Among its notable functional properties, the corresponding probability density function can be unimodal, decreasing, increasing, or right -skewed. In addition, the hazard rate function can be increasing, U-shaped, or N -shaped. The PUILD thus takes advantage of these characteristics to gain flexibility in the analysis of unit data compared to the former unit inverse Lindley distribution, among others. From a theoretical point of view, many key measures were determined under closed -form expressions, including mode, quantiles, median, Bowley's skewness, Moor's kurtosis, coe ffi cient of variation, index of dispersion, moments of various types, and Lorenz and Bonferroni curves. Some important measures of uncertainty were also calculated, mainly through the incomplete gamma function. In the statistical part, the estimation of the parameters involved was studied using fifteen di ff erent methods, including the maximum likelihood method. The invariant property of this approach was then used to e ffi ciently estimate di ff erent uncertainty measures. Some simulation results were presented to support this claim. The significance of the PUILD underlying model compared to several current statistical models, including the unit inverse Lindley, exponentiated Topp-Leone, Kumaraswamy, and beta and transformed gamma models, was illustrated by two applications using real datasets.