$An equation for complex fractional diffusion created by the Struve function with a T-symmetric univalent solution$

An equation for complex fractional diffusion created by the Struve function with a T-symmetric univalent solution

A TT-symmetric univalent function is a complex valued function that is conformally mapping the unit disk onto itself and satisfies the symmetry condition ϕ[T](ζ)=[ϕ(ζT)]1∕T{\phi }^{\left[T]}\left(\zeta )={\left[\phi \left({\zeta }^{T})]}^{1/T} for all ζ\zeta in the unit disk. In other words, it is...

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Bibliographic Details
Main Authors:	Ibrahim Rabha W., Baleanu Dumitru
Format:	Article
Language:	English
Published:	De Gruyter 2024-04-01
Series:	Demonstratio Mathematica
Subjects:	fractional calculus subordination and superordination analytic function inequalities univalent function open unit disk fractional differential equation 30c55 30c45
Online Access:	https://doi.org/10.1515/dema-2023-0116

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