On the polar derivative of a polynomial
Abstract
Let P(z) be a polynomial of degree n having no zero in |z|<k where k≥ 1, then for every real or complex number α with |α|≥ 1 it is known equation* |z|=1|Dα P(z)|≤ n(|α|+k1+k)|z|=1|P(z)|, equation* where Dα P(z)=nP(z)+(α-z)P(z) denote the polar derivative of the polynomial P(z) of degree n with respect to a point α∈C. In this paper, by a simple method, a refinement of above inequality and other related results are obtained.
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