Stable and real-zero polynomials in two variables

Abstract

For every bivariate polynomial p(z1, z2) of bidegree (n1, n2), with p(0,0)=1, which has no zeros in the open unit bidisk, we construct a determinantal representation of the form p(z1,z2)= (I - K Z), where Z is an (n1+n2)×(n1+n2) diagonal matrix with coordinate variables z1, z2 on the diagonal and K is a contraction. We show that K may be chosen to be unitary if and only if p is a (unimodular) constant multiple of its reverse. Furthermore, for every bivariate real-zero polynomial p(x1, x2), with p(0,0)=1, we provide a construction to build a representation of the form p(x1,x2)= (I+x1A1+x2A2), where A1 and A2 are Hermitian matrices of size equal to the degree of p. A key component of both constructions is a stable factorization of a positive semidefinite matrix-valued polynomial in one variable, either on the circle (trigonometric polynomial) or on the real line (algebraic polynomial).