Nuij type pencils of hyperbolic polynomials

Abstract

Nuij's theorem states that if a polynomial p∈ R[z] is hyperbolic (i.e., has only real roots) then p+sp' is also hyperbolic for any s∈ R. We study other perturbations of hyperbolic polynomials of the form pa(z,s): =p(z) +Σk=1d akskp(k)(z). We give a full characterization of those a= (a1, …, ad) ∈ Rd for which pa(z,s) is a pencil of hyperbolic polynomials. We give also a full characterization of those a= (a1, …, ad) ∈ Rd for which the associated families pa(z,s) admit universal determinantal representations. In fact we show that all these sequences come from special symmetric Toeplitz matrices.