Author
Listed:
- Layth T. Khudhuir
(Department Medical Instrumentation Techniques Engineering, Colleges of Technical Engineering, University of Northern Technical, Mosul 41002, Iraq
Department of Mathematics, College of Science, University of Baghdad, Baghdad 10071, Iraq)
- Hiba F. Al-Janaby
(Department of Mathematics, College of Science, University of Baghdad, Baghdad 10071, Iraq)
- Firas Ghanim
(Department of Mathematics, College of Sciences, University of Sharjah, Sharjah P.O. Box 27272, United Arab Emirates)
- Alina Alb Lupaș
(Department of Mathematics and Computer Science, University of Oradea, 1 Universitatii Street, 410087 Oradea, Romania)
Abstract
In recent years, special function theory has played an increasingly important role in the development of advanced mathematical models and statistical distributions. In this paper, a new extension of the Euler Beta function is introduced by employing the Wright function as a kernel, leading to the formulation of the Beta–Wright function. Several fundamental properties of the proposed function are systematically investigated, including summation formulas, functional relations, Mellin transforms, integral representations, and derivative formulas. Furthermore, extended forms of Gauss and confluent hypergeometric functions are constructed within this framework. In addition to its theoretical significance, the proposed function is applied to statistical modeling, and the associated distributions are analyzed using graphical and analytical techniques. The obtained results demonstrate that the Beta–Wright function provides a flexible and effective tool for both analytical investigations and statistical applications.
Suggested Citation
Layth T. Khudhuir & Hiba F. Al-Janaby & Firas Ghanim & Alina Alb Lupaș, 2026.
"A Wright-Based Generalization of the Euler Beta Function with Statistical Applications,"
Mathematics, MDPI, vol. 14(6), pages 1-16, March.
Handle:
RePEc:gam:jmathe:v:14:y:2026:i:6:p:1069-:d:1900629
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