Pre-Schwarzian and Schwarzian norm Estimates for Robertson class
Abstract
Let A denote the class of analytic functions f on the unit disk D=\z∈C : |z|<1\, normalized by f(0)=0 and f(0)=1. For -π/2<α<π/2, let Sα be the subclass of A consisting of functions f that satisfy the relation Re\eiα(1+zf(z)/f(z))\>0 for z∈D. In this paper, we first give an equivalent characterization for a subclass of Robertson functions; then we present the distortion and growth theorems and obtain the pre-Schwarzian and Schwarzian norms for the subclass Sα. In addition, a sharp upper bound of the Schwarzian norm for the subclass is given in terms of the value f (0).
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