Some application of Grunsky coefficients in the theory of univalent functions

Abstract

Let function f be normalized, analytic and univalent in the unit disk D=\z:|z|<1\ and f(z)=z+Σn=2∞ an zn. Using a method based on Grusky coefficients we study several problems over that class of univalent functions: upper bounds of the special case of the generalised Zalcman conjecture |a2a3-a4|, of the third logarithmic coefficient, and of the second Hankel determinant for the logarithmic coefficients.