On a certain subclass of strongly starlike functions

Abstract

Let S*(α1,α2), where α1, α2 ∈ (0,1], represent the class of functions f that are analytic in the open unit disk D, normalized by f(0) = f'(0) - 1=0, and satisfying the following double-sided inequality: equation* -πα12< \zf'(z)f(z)\ <πα22, (z∈D). equation* In this manuscript, we estimate the coefficients and logarithmic coefficients associated with functions that belong to the class S*(α1,α2). As a result, we provide a general bound for the coefficients of a strongly starlike function, which has been an open question until now. Finally, we derive upper and lower bounds for the expression Re\zf'(z)/f(z)\, where f∈ S*(α1,α2).