On real part theorem for the higher derivatives of analytic functions in the unit disk

Abstract

Let n be a positive integer. Let U be the unit disk, p 1 and let hp( U) be the Hardy space of harmonic functions. Kresin and Maz'ya in a recent paper found the representation for the function Hn,p(z) in the inequality |f(n) (z)|≤ Hn,p(z)|(f- Pl)|hp( U), f∈ hp( U), z∈ U, where Pl is a polynomial of degree l n-1. We find or represent the sharp constant Cp,n in the inequality Hn,p(z) Cp,n(1-|z|2)1/p+n. This extends a recent result of the second author and Markovi\'c, where it was considered the case n=1 only. As a corollary, an inequality for the modulus of the n-th derivative of an analytic function defined in a complex domain with the bounded real part is obtained. This result improves some recent result of Kresin and Maz'ya.