Sum-of-square-of-rational-function based representations of positive semidefinite polynomial matrices

Abstract

The paper proves sum-of-square-of-rational-function based representations (shortly, sosrf-based representations) of polynomial matrices that are positive semidefinite on some special sets: Rn; R and its intervals [a,b], [0,∞); and the strips [a,b] × R ⊂ R2. A method for numerically computing such representations is also presented. The methodology is divided into two stages: (S1) diagonalizing the initial polynomial matrix based on the Schm\"udgen's procedure Schmudgen09; (S2) for each diagonal element of the resulting matrix, find its low rank sosrf-representation satisfying the Artin's theorem solving the Hilbert's 17th problem. Some numerical tests and illustrations with OCTAVE are also presented for each type of polynomial matrices.