Coefficient bounds for starlike functions associated with Gregory coefficients

Abstract

It is of interest to know the sharp bounds of the Hankel determinant, Zalcman functionals, Fekete-Szeg o inequality as a part of coefficient problems for different classes of functions. Let H be the class of functions f which are holomorphic in the open unit disk D=\z∈C: |z|<1\ of the form align* f(z)=z+Σn=2∞anzn\; for\; z∈D align* and suppose that align* Ff(z):=f(z)z=2Σn=1∞γn(f)zn, \;\; z∈D,\;\; 1:=0, align* where γn(f) is the logarithmic coefficients. The second Hankel determinant of logarithmic coefficients H2,1(Ff/2) is defined as: H2,1(Ff/2) :=γ1γ3 -γ22, where γ1, γ2, and γ3 are the first, second and third logarithmic coefficients of functions belonging to the class S of normalized univalent functions. In this article, we first establish sharp inequalities |H2,1(Ff/2)|≤ 1/64 with logarithmic coefficients for the classes of starlike functions associated with Gregory coefficients. In addition, we establish the sharpness of Fekete-Szeg o inequality, Zalcman functional and generalized Zalcman functional for the class starlike functions associated with Gregory coefficients.

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