Proof of The Generalized Zalcman Conjecture for Initial Coefficients of Univalent Functions

Abstract

Let S denote the class of analytic and univalent ( i.e., one-to-one) functions f(z)= z+Σn=2∞an zn in the unit disk D=\z∈ C:|z|<1\. For f∈ S, Ma proposed the generalized Zalcman conjecture that |anam-an+m-1| (n-1)(m-1),\,\,\, for n2,\, m 2, with equality only for the Koebe function k(z) = z/(1 - z)2 and its rotations. In this paper using the properties of holomorphic motion and Krushkal's Surgery Lemma Krushkal-1995, we prove the generalized Zalcman conjecture when n=2, m=3 and n=2, m=4.