Characterization of Matrix K-Positivity Preserver for K=Rn and for Compact Sets K⊂eqRn

Abstract

For any closed K⊂eqRn, in [P.\ J.\ di\,Dio, K.\ Schm\"udgen: K-Positivity Preserver and their Generators, SIAM J.\ Appl.\ Algebra Geom.\ 9 (2025), 794--824] all K-positivity preserver have been characterized, i.e., all linear maps T:R[x1,…,xn][x1,…,xn] such that Tp≥ 0 on K for all p≥ 0 on K. An important extension of polynomials R[x1,…,xn] with real coefficients are polynomials Rm× m[x1,…,xn] with matrix coefficients. Non-negativity on K for matrix polynomials with Hermitian coefficients Hermm is then p(x) 0 for all x∈ K. In the current work, we investigate linear maps T:Hermm[x1,…,xn]m[x1,…,xn]. We focus on matrix K-positivity preserver, i.e., Tp 0 on K for all p 0 on K. For K=Rn and compact sets K⊂eqRn, we give characterizations of matrix K-positivity preservers. We discuss the difference between the real and the matrix coefficient case and where our proof fails for general sets K⊂eqRn with K≠ Rn and K non-compact.

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