Mathematics (Aug 2023)

Distributional Representation of a Special Fox–Wright Function with an Application

  • Asifa Tassaddiq,
  • Rekha Srivastava,
  • Ruhaila Md Kasmani,
  • Dalal Khalid Almutairi

DOI
https://doi.org/10.3390/math11153372
Journal volume & issue
Vol. 11, no. 15
p. 3372

Abstract

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A review of the literature demonstrates that the Fox–Wright function is not only a mathematical puzzle, but its role is naturally to represent basic physical phenomena. Motivated by this fact, we studied a new representation of this function in terms of complex delta functions. This representation was useful to compute its Laplace transform with respect to the third parameter γ for which it also generalizes the one and two-parameter Mittag-Leffler functions. New identities involving the Fox–Wright function were discussed and used to simplify the results. Different fractional transforms were evaluated and the solution of a fractional kinetic equation was obtained by using its new representation. Several new properties of this function were discussed as a distribution.

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