Sharp Coefficient and Inverse Problems for Holomorphic Semigroup Generators

Abstract

In this paper, we study extremal problems for coefficient functionals associated with a distinguished subclass of holomorphic semigroup generators, denoted by Aβ (0 β 1), defined on the unit disk D. This class forms a natural filtration of the class G0 of infinitesimal generators, with the class R of functions of bounded turning arising as its minimal element. We obtain sharp bounds for the initial logarithmic coefficients γn, the inverse coefficients An, and the logarithmic inverse coefficients n for n = 1,2,3 within the class Aβ. In addition, we address the successive coefficient problem by deriving sharp upper and lower estimates for the differences |An+1| - |An| for n = 1,2. Furthermore, we establish sharp bounds for a generalized Fekete--Szeg\"o functional in the class R. The extremality of the obtained results is demonstrated by explicit constructions, including functions related to Gauss hypergeometric functions. Our results unify and extend several earlier contributions in geometric function theory and reveal a structural connection between coefficient problems for functions of bounded turning and the dynamics of holomorphic semigroup generators.