Noncommutative polynomials nonnegative on a variety intersect a convex set
Abstract
By a result of Helton and McCullough, open bounded convex free semialgebraic sets are exactly open (matricial) solution sets D_L of a linear matrix inequality (LMI) L(X)>0. This paper gives a precise algebraic certificate for a polynomial being nonnegative on a convex semialgebraic set intersect a variety, a so-called "Perfect" Positivstellensatz. For example, given a generic convex free semialgebraic set D_L we determine all "(strong sense) defining polynomials" p for D_L. This follows from our general result for a given linear pencil L and a finite set I of rows of polynomials. A matrix polynomial p is positive where L is positive and I vanishes if and only if p has a weighted sum of squares representation module the "L-real radical" of I. In such a representation the degrees of the polynomials appearing depend in a very tame way only on the degree of p and the degrees of the elements of I. Further, this paper gives an efficient algorithm for computing the L-real radical of I. Our Positivstellensatz has a number of additional consequences which are presented.
Cite
@article{arxiv.1308.0051,
title = {Noncommutative polynomials nonnegative on a variety intersect a convex set},
author = {J. William Helton and Igor Klep and Christopher S. Nelson},
journal= {arXiv preprint arXiv:1308.0051},
year = {2018}
}
Comments
69 pages, includes a table of contents