On harmonic combination of univalent functions

Abstract

Let S be the class of all functions f that are analytic and univalent in the unit disk with the normalization f(0)=f'(0)-1=0. Let U (λ) denote the set of all f∈ S satisfying the condition |f'(z)(zf(z))2-1| <λ ~for z∈ , for some λ ∈ (0,1]. In this paper, among other things, we study a "harmonic mean" of two univalent analytic functions. More precisely, we discuss the properties of the class of functions F of the form zF(z)=1/2(zf(z)+zg(z)), where f,g∈ S or f,g∈ U(1). In particular, we determine the radius of univalency of F, and propose two conjectures concerning the univalency of F.