A Real Nullstellensatz for Free Modules

Jaka Cimpric

arXiv:1302.2358·math.AG·April 24, 2018

A Real Nullstellensatz for Free Modules

Jaka Cimpric

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TL;DR

This paper establishes a real Nullstellensatz for matrix polynomials over real multivariate polynomial rings, characterizing when a matrix polynomial annihilates vectors at common zeros of other matrix polynomials.

Contribution

It introduces a one-sided Real Nullstellensatz for free modules, extending classical algebraic geometry results to matrix polynomial settings.

Findings

01

Characterization of matrix polynomial annihilation conditions

02

Proof by induction on matrix size n

03

Extension of Nullstellensatz to free modules

Abstract

Let $A$ be the algebra of all $n \times n$ matrices with entries from $\RR [x_{1}, \dots, x_{d}]$ and let $G_{1}, \dots, G_{m}, F \in A$ . We will show that $F (a) v = 0$ for every $a \in \RR^{d}$ and $v \in \RR^{n}$ such that $G_{i} (a) v = 0$ for all $i$ if and only if $F$ belongs to the smallest real left ideal of $A$ which contains $G_{1}, \dots, G_{m}$ . Here a left ideal $J$ of $A$ is real if for every $H_{1}, \dots, H_{k} \in A$ such that $H_{1}^{T} H_{1} + \dots + H_{k}^{T} H_{k} \in J + J^{T}$ we have that $H_{1}, \dots, H_{k} \in J$ . We call this result the one-sided Real Nullstellensatz for matrix polynomials. We first prove by induction on $n$ that it holds when $G_{1}, \dots, G_{m}, F$ have zeros everywhere except in the first row. This auxiliary result can be formulated as a Real Nullstellensatz for the free module $\RR [x_{1}, \dots, x_{d}]^{n}$ .

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