SHARP BOUNDS OF SOME COEFFICIENT FUNCTIONALS OVER THE CLASS OF FUNCTIONS CONVEX IN THE DIRECTION OF THE IMAGINARY AXIS

Abstract

We apply the Schwarz lemma to find general formulas for the third coefficient of Carathéodory functions dependent on a parameter in the closed unit polydisk. Next we find sharp estimates of the Hankel determinant$H_{2,2}$and Zalcman functional$J_{2,3}$over the class${\mathcal{C}}{\mathcal{V}}$of analytic functions$f$normalised such that$\text{Re}\{(1-z^{2})f^{\prime }(z)\}>0$for$z\in \mathbb{D}:=\{z\in \mathbb{C}:|z|<1\}$, that is, the subclass of the class of functions convex in the direction of the imaginary axis.