Conic stability of polynomials and positive maps
Abstract
Given a proper cone , a multivariate polynomial is called -stable if it does not have a root whose vector of the imaginary parts is contained in the interior of . If is the non-negative orthant, then -stability specializes to the usual notion of stability of polynomials. We study conditions and certificates for the -stability of a given polynomial , especially for the case of determinantal polynomials as well as for quadratic polynomials. A particular focus is on psd-stability. For cones with a spectrahedral representation, we construct a semidefinite feasibility problem, which, in the case of feasibility, certifies -stability of . This reduction to a semidefinite problem builds upon techniques from the connection of containment of spectrahedra and positive maps. In the case of psd-stability, if the criterion is satisfied, we can explicitly construct a determinantal representation of the given polynomial. We also show that under certain conditions, for a -stable polynomial , the criterion is at least fulfilled for some scaled version of .
Cite
@article{arxiv.1908.11124,
title = {Conic stability of polynomials and positive maps},
author = {Papri Dey and Stephan Gardoll and Thorsten Theobald},
journal= {arXiv preprint arXiv:1908.11124},
year = {2020}
}
Comments
Revised version, 21 pages