Abstract:
We consider the class of univalent holomorphic functions $F(z)$ in the unit disk which are normalized by conditions $F(0)=0$, $F'(0)=1$. Estimates for the moduli of the Newton coefficients of these functions are established. It is shown that these estimates are sharp.
Keywords:holomorphic function, Newton coefficient, Bieberbach's conjecture, divided difference of $n$th order, maximum principle.
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