Numerical radius inequalities and estimation of zeros of polynomials

Abstract

Let A be a bounded linear operator defined on a complex Hilbert space and let |A|=(A*A)1/2 be the positive square root of A. Among other refinements of the well known numerical radius inequality w2(A)≤ 12 \|A*A+AA*\|, we show that eqnarray* w2(A)&≤&14 w2 (|A|+i|A*|)+18\||A|2+|A*|2 \|+14w(|A||A*|) &≤& 12 \|A*A+AA*\|. eqnarray* Also, we develop inequalities involving numerical radius and spectral radius for the sum of the product operators, from which we derive the following inequalities wp(A) ≤ 12 w(|A|p+i|A*|p )≤ \|A\|p for all p≥ 1. Further, we derive new bounds for the zeros of complex polynomials.