Ebrahim Analouei Adegani scite author profile

In this article, we introduce a general family of analytic and bi-univalent functions in the open unit disk, which is defined by applying the principle of differential subordination between analytic functions and the Tremblay fractional derivative operator. The upper bounds for the general coefficients | a n | of functions in this subclass are found by using the Faber polynomial expansion. We have thereby generalized and improved some of the previously published results.

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An Unified Approach to Second Hankel Determinant of Bi-Subordinate Functions

Kanas

Adegani

Zireh

2017

Mediterr. J. Math.

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Faber polynomial coefficient estimates for subclass of bi-univalent functions defined by quasi-subordinate

Zireh

Adegani

Bidkham

2018

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In this paper, we use the Faber polynomial expansion to find upper bounds for |an| (n ≥ 3) coefficients of functions belong to classes $\begin{array}{} H_{q}^{\Sigma}(\lambda,h),\, ST_{q}^{\Sigma}(\alpha,h)\,\text{ and} \,\,M_{q}^{\Sigma}(\alpha,h) \end{array}$ which are defined by quasi-subordinations in the open unit disk 𝕌. Further, we generalize some of the previously published results.

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