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On the Arcsecant Hyperbolic Normal Distribution. Properties, Quantile Regression Modeling and Applications

Mustafa Ç. Korkmaz, Christophe Chesneau, Zehra Sedef Korkmaz

2021Symmetry57 citationsDOIOpen Access PDF

Abstract

This work proposes a new distribution defined on the unit interval. It is obtained by a novel transformation of a normal random variable involving the hyperbolic secant function and its inverse. The use of such a function in distribution theory has not received much attention in the literature, and may be of interest for theoretical and practical purposes. Basic statistical properties of the newly defined distribution are derived, including moments, skewness, kurtosis and order statistics. For the related model, the parametric estimation is examined through different methods. We assess the performance of the obtained estimates by two complementary simulation studies. Also, the quantile regression model based on the proposed distribution is introduced. Applications to three real datasets show that the proposed models are quite competitive in comparison to well-established models.

Topics & Concepts

KurtosisMathematicsSkewnessQuantile functionQuantileApplied mathematicsInverse hyperbolic functionNormal distributionNonparametric statisticsParametric statisticsStatisticsCumulative distribution functionHyperbolic functionProbability density functionMathematical analysisHyperbolic manifoldStatistical Distribution Estimation and ApplicationsProbabilistic and Robust Engineering DesignAdvanced Statistical Methods and Models
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