A Real Nullstellensatz for Free Modules

Abstract

Let A be the algebra of all n × n matrices with entries from [x1,…,xd] and let G1,…,Gm,F ∈ A. We will show that F(a)v=0 for every a ∈ d and v ∈ n such that Gi(a)v=0 for all i if and only if F belongs to the smallest real left ideal of A which contains G1,…,Gm. Here a left ideal J of A is real if for every H1,…,Hk ∈ A such that H1T H1+…+HkT Hk ∈ J+JT we have that H1,…,Hk ∈ J. We call this result the one-sided Real Nullstellensatz for matrix polynomials. We first prove by induction on n that it holds when G1,…,Gm,F have zeros everywhere except in the first row. This auxiliary result can be formulated as a Real Nullstellensatz for the free module [x1,…,xd]n.