Schur--Horn type inequalities for hyperbolic polynomials
Abstract
We establish a Schur--Horn type inequality for symmetric hyperbolic polynomials. As an immediate consequence, we resolve a conjecture of Nam Q. Le on Hadamard-type inequalities for hyperbolic polynomials. Our argument is based on the Schur--Horn theorem, the Birkhoff theorem, and G{\aa}rding's concavity theorem for hyperbolicity cones. Beyond the eigenvalue level, we develop a symmetrization principle on hyperbolicity cones: if a hyperbolic polynomial is invariant under a finite group action, then its value increases under the associated Reynolds operator (group averaging). Applied to the sign-flip symmetries of linear principal minor polynomials introduced by Blekherman et al., this yields a short proof of the hyperbolic Fischer--Hadamard inequalities for PSD-stable lpm polynomials.
Cite
@article{arxiv.2601.10602,
title = {Schur--Horn type inequalities for hyperbolic polynomials},
author = {Teng Zhang},
journal= {arXiv preprint arXiv:2601.10602},
year = {2026}
}
Comments
12 pages. All comments are welcome!