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New Families of Bi-Univalent Functions Governed by Gegenbauer Polynomials

Abbas Kareem Wanas

2021Earthline Journal of Mathematical Sciences10 citationsDOIOpen Access PDF

Abstract

The aim of this article is to initiating an exploration of the properties of bi-univalent functions related to Gegenbauer polynomials. To do so, we introduce a new families \mathbb{T}_\Sigma (\gamma, \phi, \mu, \eta, \theta, \gimel, t, \delta) and \mathbb{S}_\Sigma (\sigma, \eta, \theta, \gimel, t, \delta ) of holomorphic and bi-univalent functions. We derive estimates on the initial coefficients and solve the Fekete-Szeg problem of functions in these families.

Topics & Concepts

Holomorphic functionSigmaMathematicsPure mathematicsGegenbauer polynomialsOrthogonal polynomialsCombinatoricsAlgebra over a fieldClassical orthogonal polynomialsPhysicsQuantum mechanicsAnalytic and geometric function theoryX-ray Diffraction in CrystallographyCrystal Structures and Properties