Interpolation by polynomials with symmetries on the imaginary axis

Abstract

We here specialize the standard matrix-valued polynomial interpolation to the case where on the imaginary axis the interpolating polynomials admit various symmetries: Positive semidefinite, Skew-Hermitian, J-Hermitian, Hamiltonian and others. The procedure is comprized of three stages, illustrated through the case where on i the interpolating polynomials are to be positive semidefinite. We first, on the expense of doubling the degree, obtain a minimal degree interpolating polynomial P(s) which on i is Hermitian. Then we find all polynomials (s), vanishing at the interpolation points which are positive semidefinite on i. Finally, using the fact that the set of positive semidefinite matrices is a convex subcone of Hermitian matrices, one can compute the minimal scalar β≥ 0 so that P(s)+β(s) satisfies all interpolation constraints for all β≥β. This approach is then adapted to cases when the family of interpolating polynomials is not convex. Whenever convex, we parameterize all minimal degree interpolating polynomials.