Matrix-valued Hermitian Positivstellensatz, lurking contractions, and contractive determinantal representations of stable polynomials

Abstract

We prove that every matrix-valued rational function F, which is regular on the closure of a bounded domain DP in Cd and which has the associated Agler norm strictly less than 1, admits a finite-dimensional contractive realization F(z)= D + CP(z)n(I-AP(z)n)-1 B. Here DP is defined by the inequality \|P(z)\|<1, where P(z) is a direct sum of matrix polynomials Pi(z) (so that appropriate Archimedean and approximation conditions are satisfied), and P(z)n=i=1kPi(z) Ini, with some k-tuple n of multiplicities ni; special cases include the open unit polydisk and the classical Cartan domains. The proof uses a matrix-valued version of a Hermitian Positivstellensatz by Putinar, and a lurking contraction argument. As a consequence, we show that every polynomial with no zeros on the closure of DP is a factor of (I - KP(z)n), with a contractive matrix K.