Differential Inequalities and Univalent Functions

Abstract

Let M be the class of analytic functions in the unit disk with the normalization f(0)=f'(0)-1=0, and satisfying the condition |z2 (zf(z) )''+ f'(z)(zf(z) )2-1 |≤ 1, z∈ . Functions in M are known to be univalent in . In this paper, it is shown that the harmonic mean of two functions in M are closed, that is, it belongs again to M. This result also holds for other related classes of normalized univalent functions. A number of new examples of functions in M are shown to be starlike in . However we conjecture that functions in M are not necessarily starlike, as apparently supported by other examples.