On logarithmic coefficients of some close-to-convex functions

Abstract

The logarithmic coefficients γn of an analytic and univalent function f in the unit disk D=\z∈C:|z|<1\ with the normalization f(0)=0=f'(0)-1 is defined by f(z)z= 2Σn=1∞ γn zn. Recently, D.K. Thomas [On the logarithmic coefficients of close to convex functions, Proc. Amer. Math. Soc. 144 (2016), 1681--1687] proved that |γ3| 712 for functions in a subclass of close-to-convex functions (with argument 0) and claimed that the estimate is sharp by providing a form of a extremal function. In the present paper, we pointed out that such extremal functions do not exist and the estimate is not sharp by providing a much more improved bound for the whole class of close-to-convex functions (with argument 0). We also determine a sharp upper bound of |γ3| for close-to-convex functions (with argument 0) with respect to the Koebe function.