Radius and Convolution problems of analytic functions involving Semigroup Generators

Abstract: We establish the membership criteria in terms of Hadamard product for a normalized analytic function to be in the class of infinitesimal generators. Furthermore, the embedding of various subclasses of normalized univalent functions in the class of infinitesimal generators and the radii problems for this class are studied. The results derived, generalize the already known results.

“…We proceed with criteria of the membership of a function f ∈ A in the class A α involving the Hadamard product (2.4) obtained in [32], the Gauß hypergeometric function 2 F 1 (a, b; c; z), see (2.7), and Bernardi integral operator (2.1), see [26].…”

The Fekete–Szegö functional and filtration of generators

“…We proceed with criteria of the membership of a function f ∈ A in the class A α involving the Hadamard product (2.4) obtained in [32], the Gauß hypergeometric function 2 F 1 (a, b; c; z), see (2.7), and Bernardi integral operator (2.1), see [26].…”

The Fekete–Szegö functional and filtration of generators