Statistical Inference for the Unit Gompertz Power Series Distribution Using Ranked Set Sampling with Applications

Yousef, Manal; Hassan, Amal; Almetwally, Ehab

doi:10.21608/aunj.2023.246431.1068

Statistical Inference for the Unit Gompertz Power Series Distribution Using Ranked Set Sampling with Applications

Document Type : Novel Research Articles

Authors

¹ New Valley university

² Faculty of Graduate Studies for Statistical Research, Cairo University, Giza

³ Faculty of Business Administration, Delta University for Science and Technology, Gamasa

10.21608/aunj.2023.246431.1068

Abstract

We present the unit Gompertz-power series distribution class, which is formed
by combining unit Gompertz and power series distributions. This new class of distributions
includes some special cases, such as the unit Gompertz binomial, the unit Gompertz Poisson, the unit Gompertz geometric, and the unit Gompertz logarithmic distributions. The
new class’s mathematical properties, such as quantiles, moments, generating function, order
statistics, and Renyi entropy are investigated. The unit Gompertz-power series distribution’s
sub-models are thoroughly examined. The maximum likelihood and Bayesian methodologies
are used to estimate the model parameters for the complete sample and ranked set sampling.
The Bayesian estimation approach under the squared error and linear exponential loss functions is examined. Finally, we demonstrate applications of two real data sets to highlight
the adaptability and potential of the one sub-model in the new class of distributions.
Keywords: Unit Gompertz distribution; ranked set sampling; order statistics; linex loss function;
Metropolis-Hastings; power series distribution.

Keywords