Improvements of certain results of the class S of univalent functions

Abstract

For f∈ S, the class univalent functions in the unit disk D and given by f(z)=z+Σn=2∞ an zn for z∈ D, we improve previous bounds for the second and third Hankel determinants in case when either a2=0, or a3=0. We also improve an upper bound for the coefficient difference |a4|-|a3| when f∈ S.

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