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Sharp Bounds of the Fekete–Szegö Problem and Second Hankel Determinant for Certain Bi-Univalent Functions Defined by a Novel q-Differential Operator Associated with q-Limaçon Domain

Timilehin Gideon Shaba, Serkan Aracı, B.O. Adebesin, Fairouz Tchier, Saira Zainab, Bilal Khan

2023Fractal and Fractional23 citationsDOIOpen Access PDF

Abstract

In this present paper, we define a new operator in conjugation with the basic (or q-) calculus. We then make use of this newly defined operator and define a new class of analytic and bi-univalent functions associated with the q-derivative operator. Furthermore, we find the initial Taylor–Maclaurin coefficients for these newly defined function classes of analytic and bi-univalent functions. We also show that these bounds are sharp. The sharp second Hankel determinant is also given for this newly defined function class.

Topics & Concepts

MathematicsOperator (biology)Analytic functionDifferential operatorDomain (mathematical analysis)Class (philosophy)Function (biology)Pure mathematicsDerivative (finance)Linear mapMathematical analysisDiscrete mathematicsComputer scienceBiochemistryRepressorBiologyFinancial economicsGeneEvolutionary biologyTranscription factorArtificial intelligenceEconomicsChemistryAnalytic and geometric function theoryHolomorphic and Operator TheoryMathematical functions and polynomials
Sharp Bounds of the Fekete–Szegö Problem and Second Hankel Determinant for Certain Bi-Univalent Functions Defined by a Novel q-Differential Operator Associated with q-Limaçon Domain | Litcius