A Newman type bound for Lp[-1,1]-means of the logarithmic derivative of polynomials having all zeros on the unit circle

Abstract

Let gn, n=1,2,…, be the logarithmic derivative of a complex polynomial having all zeros on the unit circle, i.e., a function of the form gn(z)=(z-z1)-1+…+(z-zn)-1, |z1|=…=|zn|=1. For any p>0, we establish the bound \[∫-11 |gn(x)|p\, dx>Cp\, np-1,\] sharp in the order of the quantity n, where Cp>0 is a constant, depending only on p. The particular case p=1 of this inequality can be considered as a stronger variant of the well-known estimate |z|<1 |gn(z)|\,dxdy>c>0 for the area integral of gn, obtained by D.J. Newman (1972). The result also shows that the set \gn\ is not dense in the spaces Lp[-1,1], p 1.