Free bianalytic maps between spectrahedra and spectraballs in a generic setting

Abstract

Given a tuple E=(E1,…,Eg) of d× d matrices, the collection of those tuples of matrices X=(X1,…,Xg) (of the same size) such that \| Σ Ej Xj\| 1 is called a spectraball BE. Likewise, given a tuple B=(B1,…,Bg) of e× e matrices the collection of tuples of matrices X=(X1,…,Xg) (of the same size) such that I + Σ Bj Xj +Σ Bj* Xj* 0 is a free spectrahedron DB. Assuming E and B are irreducible, plus an additional mild hypothesis, there is a free bianalytic map p: BE DB normalized by p(0)=0 and p'(0)=I if and only if BE= BB and B spans an algebra. Moreover p is unique, rational and has an elegant algebraic representation.