On the zeros of certain composite polynomials and an operator preserving inequalities

Abstract

If all the zeros of nth degree polynomials f(z) and g(z) = Σk=0nλknkzk respectively lie in the cricular regions |z|≤ r and |z| ≤ s|z-σ|, s>0, then it was proved by Marden [p. 86]mm that all the zeros of the polynomial h(z)= Σk=0nλk f(k)(z) (σ z)kk! lie in the circle |z| ≤ r ~ (1,s). In this paper, we relax the condition that f(z) and g(z) are of the same degree and instead assume that f(z) and g(z) are polynomials of arbitrary degree n and m respectively, m≤ n, and obtain a generalization of this result. As an application, we also introduce a linear operator which preserve Bernstein type polynomial inequalities.

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