Lp mean estimates for an operator preserving inequalities between polynomials

Abstract

If P(z) be a polynomial of degree at most n which does not vanish in |z| < 1, it was recently formulated by Shah and Liman [Integral estimates for the family of B-operators, Operators and Matrices, 5(2011), 79 - 87]wl that for every R≥ 1, p≥ 1, \[\|B[Pσ](z)\|p ≤Rn|n|+|λ0|\|1+z\|p\|P(z)\|p,\] where B is a Bn-operator with parameters λ0, λ1, λ2 in the sense of Rahman qir, σ(z)=Rz and n=λ0+λ1n22 +λ2n3(n-1)8. Unfortunately the proof of this result is not correct. In this paper, we present a more general sharp Lp-inequalities for Bn-operators which not only provide a correct proof of the above inequality as a special case but also extend them for 0 ≤ p <1 as well.