Integral mean estimates for polynomials with restricted zeros (Q1122022)

Let P(z) be a polynomial of degree n having all its zeros in the disc \(| z| \leq K\). The main results of the author can be written in more compact form using \(L^ p\) norms on [0,2\(\pi\) ] as follows: \(n\| P(e^{i\theta})\|_ q\leq \| 1+K^ ne^{i\theta}\|_ q\| P'(e^{i\theta})\|_{\infty}\) for \(K\geq 1\) and \(q\geq 1\), and \(n\| P(e^{i\theta})/P'(e^{i\theta})\|_ q\leq \| 1+Ke^{i\theta}\|_ q\) for \(K\leq 1\) and \(q\geq 0\). Both estimates are sharp and generalize results known for \(K=1\).