Such a decomposition has the form of p(z)=f(z)g(z) where g(z) and f(z) have no roots with negative and nonnegative real parts, respectively. The polynomial f(z), whose roots lie in the open plane , is called a Hurwitz polynomial or, if its coefficients are real, a stable polynomial.
Abstract: We propose a stable factorization procedure to generate a strictly. Hurwitz polynomial from a given strictly positive even polynomial. This prob-.
(PDF) Stable Factorization of Strictly Hurwitz Polynomials
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We propose a stable factorization procedure to generate a strictly Hurwitz polynomial from a given strictly positive even polynomial.
We propose a stable factorization procedure to generate a strictly Hurwitz polynomial from a given strictly positive even polynomial.
Dec 1, 2010 · Abstract. We propose a stable factorization procedure to generate a strictly Hurwitz polynomial from a given strictly positive even polynomial.
Nov 26, 2024 · We establish various certifying determinantal representation results for a polynomial that contains as a factor a prescribed multivariable ...
701-709Stable Factorization of Strictly Hurwitz PolynomialsÖ. Eğecioğlu, B. S. YarmanÖmer EğecioğluDepartment of Computer ScienceUniversity of California ...
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In this paper we present a numerical method for computing the coefficients of the Hurwitz factor f(z) of a polynomial p(z). It is based on a polynomial ...
A necessary and sufficient condition that a polynomial is Hurwitz is that it passes the Routh–Hurwitz stability criterion.
Oct 8, 2017 · It follows that if all zeros of P have negative real part then it can be written as a product of monic polynomials with positive coefficients.