Annular bounds for the zeros of a polynomial from companion matrix

Abstract

Let p(z)=zn+an-1zn-1+an-2zn-2+…+a1z+a0 be a complex polynomial with a0≠ 0 and n≥ 3. Several new upper bounds for the moduli of the zeros of p are developed. In particular, if α=Σj=0n-1|aj|2 and z is any zero of p, then we show that eqnarray* |z|2 &≤ & 2 πn+1+|an-2|+ 14 ( |an-1|+ α )2 + 12α2-|an-1|2 + 12α, eqnarray* which is sharper than the Abu-Omar and Kittaneh's bound eqnarray* |z|2 &≤ & 2 πn+1+ 14 ( |an-1|+ α)2 + α eqnarray* if and only if 2|an-2|< Σj=0n-1|aj|2-Σj=0n-2|aj|2. The upper bounds obtained here enable us to describe smaller annuli in the complex plane containing all the zeros of p.