Faber Polynomial Coefficient Estimates for Bi-Close-to-Convex Functions Defined by the q-Fractional Derivative
H. M. Srivastava, Isra Al-Shbeil, Qin Xin, Fairouz Tchier, Shahid Khan, Sarfraz Nawaz Malik
Abstract
By utilizing the concept of the q-fractional derivative operator and bi-close-to-convex functions, we define a new subclass of A, where the class A contains normalized analytic functions in the open unit disk E and is invariant or symmetric under rotation. First, using the Faber polynomial expansion (FPE) technique, we determine the lth coefficient bound for the functions contained within this class. We provide a further explanation for the first few coefficients of bi-close-to-convex functions defined by the q-fractional derivative. We also emphasize upon a few well-known outcomes of the major findings in this article.
Topics & Concepts
MathematicsConvex functionPolynomialRegular polygonUnit diskInvariant (physics)Fractional calculusPure mathematicsDerivative (finance)Operator (biology)CombinatoricsClass (philosophy)Mathematical analysisGeometryMathematical physicsComputer scienceFinancial economicsEconomicsGeneRepressorTranscription factorArtificial intelligenceChemistryBiochemistryAnalytic and geometric function theoryPharmacological Effects of Medicinal PlantsMathematical Inequalities and Applications