Generating Statistical Distributions using Fractional Differential Equations
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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.
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Doi : https://doi.org/10.47013/16.2.11
