A Hill-Pick matrix criteria for the Lyapunov order

Abstract

The Lyapunov order appeared in the study of Nevanlinna-Pick interpolation for positive real odd functions with general (real) matrix points. For real or complex matrices A and B it is said that B Lyapunov dominates A if equation* H=H*, HA+A*H ≥ 0 HB+B*H ≥ 0. equation* (In case A and B are real we usually restrict to real Hermitian matrices H, i.e., symmetric H.) Hence B Lyapunov dominates A if all Lyapunov solutions of A are also Lyapunov solutions of B. In this chapter we restrict to the case that appears in the study of Nevanlinna-Pick interpolation, namely where B is in the bicommutant of A and where A is Lyapunov regular, meaning the eigenvalues λj of A satisfy \[ λi + λj 0, i,j=1,…,n. \] In this case we provide a matrix criteria for Lyapunov dominance of A by B. The result relies on a class of *-linear maps for which positivity and complete positivity coincide and a representation of *-linear matrix maps going back to work of R.D. Hill. The matrix criteria asks that a certain matrix, which we call the Hill-Pick matrix, be positive semidefinite.