On an operator preserving inequalities between polynomials

Abstract

Let Pn denote the space of all complex polynomials P(z)=Σj=0najzj of degree n and Bn a family of operators that maps Pn into itself. In this paper, we consider a problem of investigating the dependence of |B[Pσ](z)-α B[P](z)+β\(R+kk+r)n-|α|\B[P](z)| on the maximum and minimum modulus of |P(z)| on |z|=k for arbitrary real or complex numbers α,β∈C with |α|≤ 1,|β|≤ 1,R>r≥ k, σ(z)=Rz, (z)=rz and establish certain sharp operator preserving inequalities between polynomials, from which a variety of interesting results follow as special cases.