Noncommutative polynomials describing convex sets

Abstract

The free closed semialgebraic set Df determined by a hermitian noncommutative polynomial f is the closure of the connected component of \(X,X*) f(X,X*)>0\ containing the origin. When L is a hermitian monic linear pencil, the free closed semialgebraic set DL is the feasible set of the linear matrix inequality L(X,X*)≥ 0 and is known as a free spectrahedron. Evidently these are convex and it is well-known that a free closed semialgebraic set is convex if and only it is a free spectrahedron. The main result of this paper solves the basic problem of determining those f for which Df is convex. The solution leads to an efficient algorithm that not only determines if Df is convex, but if so, produces a minimal hermitian monic pencil L such that Df=DL. Of independent interest is a subalgorithm based on a Nichtsingul\"arstellensatz presented here: given a linear pencil L' and a hermitian monic pencil L, it determines if L' takes invertible values on the interior of DL. Finally, it is shown that if Df is convex for an irreducible hermitian polynomial f, then f has degree at most two, and arises as the Schur complement of an L such that Df=DL.