Open AccessGeneralized Wright Function and Its Properties Using Extended Beta Function
Author(s) -
Nabiullah Khan,
Talha Usma,
Mohd Aman
Publication year - 2020
Publication title -
tamkang journal of mathematics
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.324
H-Index - 18
eISSN - 0049-2930
pISSN - 2073-9826
DOI - 10.5556/j.tkjm.51.2020.3087
Subject(s) - wright , mathematics , function (biology) , mittag leffler function , fractional calculus , derivative (finance) , representation (politics) , mathematical analysis , pure mathematics , computer science , law , evolutionary biology , biology , politics , political science , financial economics , economics , programming language
Solving a linear partial dierential equation witness a noteworthy role of Wright function. Due to its usefulness and various applications, a variety of its extentions (and generalizations) have been investigated and presented. The purpose and design of the paper is intended to study and come up with a new extention of the genralized Wright function by using generalized beta function and obtain some integral representation of the freshly dened function. Also we present the Mellin transform of this function in the form of Fox Wright function. Furthermore, we obtain the recurrence relation, derivative formula for the said function and also by using an extended Riemann-Liouville fractional derivative, we present a fractional derivative formula for the extended Wright function.