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Sharp Bounds of Hankel Determinant on Logarithmic Coefficients for Functions Starlike with Exponential Function

Lei Shi, Muhammad Arif, Javed Iqbal, Khalil Ullah, Syed Muhammad Ghufran

2022Fractal and Fractional23 citationsDOIOpen Access PDF

Abstract

Using the Lebedev–Milin inequalities, bounds on the logarithmic coefficients of an analytic function can be transferred to estimates on coefficients of the function itself and related functions. From this fact, the study of logarithmic-related problems of a certain subclass of univalent functions has attracted much attention in recent years. In our present investigation, a subclass of starlike functions Se* connected with the exponential mapping was considered. The main purpose of this article is to obtain the sharp estimates of the second Hankel determinant with the logarithmic coefficient as entry for this class.

Topics & Concepts

LogarithmExponential functionMathematicsFunction (biology)SubclassLogarithmic derivativeClass (philosophy)Analytic functionElementary functionPure mathematicsMathematical analysisExponential growthApplied mathematicsComputer scienceAntibodyArtificial intelligenceEvolutionary biologyBiologyImmunologyAnalytic and geometric function theoryHolomorphic and Operator TheoryPolymer Synthesis and Characterization
Sharp Bounds of Hankel Determinant on Logarithmic Coefficients for Functions Starlike with Exponential Function | Litcius