Explicit real-part estimates for high order derivatives of analytic functions

Abstract

The representation for the sharp constant Kn, p in an estimate of the modulus of the n-th derivative of an analytic function in the upper half-plane C+ is considered. It is assumed that the boundary value of the real part of the function on ∂ C+ belongs to Lp. The representation for Kn, p comprises an optimization problem by parameter inside of the integral. This problem is solved for p=2(m+1)/(2m+1-n), n≤ 2m+1, and for some first derivatives of even order in the case p=∞. The formula for Kn,\; 2(m+1)/(2m+1-n) contains, for instance, the known expressions for K2m+1, ∞ and Km, 2 as particular cases. Also, a two-sided estimate for K2m, ∞ is derived, which leads to the asymptotic formula K2m, ∞=2 ((2m-1)!! )2/π + O ( ((2m-1)!! )2 /(2m-1) ) as m → ∞ . The lower and upper bounds of K2m, ∞ are compared with its value for the cases m=1, 2, 3, 4. As applications, some real-part theorems with explicit constants for high order derivatives of analytic functions in subdomains of complex plane are described.