Generating Statistical Distributions using Fractional Differential Equations

Loading...
Thumbnail Image

Journal Title

Journal ISSN

Volume Title

Publisher

Jordan Journal of Mathematics and Statistics(JJMS)

Abstract

In a recent paper of Dixit and Ujlayan (UD), a new fractional derivative is introduced as a convex combination of the function and its first derivative; that is Dα f(x) = (1 − α)f(x) + αf′(x). In this article, a new technique of generating fractional continuous probability distributions by solving UD fractional differential equations that associated to well-known continuous probability distributions is presented. In particular, the UD fractional probability distributions for the Exponential, Pareto, Lomax, and Levy distributions are generated. Finally, a real data application is considered for investigating the usefulness of the new fractional distributions. The results reveal that the pro posed new fractional distribution performs better than the baseline distribution.

Description

Citation

Doi : https://doi.org/10.47013/16.2.11

Endorsement

Review

Supplemented By

Referenced By