K. K. Dewan,¹ N. K. Govil,² Abdullah Mir,¹ and M. S. Pukhta¹

Copyright © 2006 K. K. Dewan et al. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

If p(z)=∑v=0navzv is a polynomial of degree n, having all its zeros in |z|≤1, then it was proved by Turán that |p′(z)|≥(n/2)max|z|=1|p(z)|. This result of Turán was generalized by Govil, who proved that if p(z) has all its zeros in |z|≤K, K≥1, then max|z|=1|p′(z)|≥(n/(1+Kn))max|z|=1|p(z)|, K≥1. In this paper, we sharpen this, and some other related results.