A few results concerning the Schur stability of the Hadamard powers and the Hadamard products of complex polynomials

Abstract

For a complex polynomial \[ f( s) =sn+an-1sn-1+…+a1s+a0% \] and for a rational number p, we consider the Schur stability problem of the p-th Hadamard power of f \[ f[ p] ( s) =sn+an-1psn-1+… +a1ps+a0p.% \] We show that there exist two numbers p≥0≥ p such that f[ p] is Schur stable for every p>p and is not Schur stable for p<p (or vice versa, depending on f). Also, we give simple sufficient conditions for the Schur stability of the Hadamard product of two complex polynomials. Numerical examples complete and illustrate the results.