Type: Article
Publication Date: 2021-08-09
Citations: 1
DOI: https://doi.org/10.1007/s00209-021-02825-4
Abstract In 2009, Borcea and Brändén characterized all linear operators on multivariate polynomials which preserve the property of being non-vanishing (stable) on products of prescribed open circular regions. We give a representation theoretic interpretation of their findings, which generalizes and simplifies their result and leads to a conceptual unification of many related results in polynomial stability theory. At the heart of this unification is a generalized Grace’s theorem which addresses polynomials whose roots are all contained in some real interval or ray. This generalization allows us to extend the Borcea–Brändén result to characterize a certain subclass of the linear operators which preserve such polynomials.
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| + PDF Chat | Amalgamation of real zero polynomials | 2023 |
David Sawall Markus Schweighofer |