Open Problems Related to the Hurwitz Stability of Polynomials Segments

Baltazar Aguirre-Hernández; Faustino Ricardo Garciá-Sosa; Carlos Arturo Loredo-Villalobos; Raúl Villafuerte-Segura; Eric Campos-Cantón

doi:10.1155/2018/2075903

Open Problems Related to the Hurwitz Stability of Polynomials Segments

Baltazar Aguirre-Hernández, Faustino Ricardo Garciá-Sosa, Carlos Arturo Loredo-Villalobos, Raúl Villafuerte-Segura, Eric Campos-Cantón

Unidad Profesional Interdisciplinaria de Ingeniería y Ciencias Sociales y Administrativas (UPIICSA)

Research output: Contribution to journal › Article › peer-review

7 Scopus citations

Abstract

In the framework of robust stability analysis of linear systems, the development of techniques and methods that help to obtain necessary and sufficient conditions to determine stability of convex combinations of polynomials is paramount. In this paper, knowing that Hurwitz polynomials set is not a convex set, a brief overview of some results and open problems concerning the stability of the convex combinations of Hurwitz polynomials is then provided.

Original language	English
Article number	2075903
Journal	Mathematical Problems in Engineering
Volume	2018
DOIs	https://doi.org/10.1155/2018/2075903
State	Published - 2018

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abstract = "In the framework of robust stability analysis of linear systems, the development of techniques and methods that help to obtain necessary and sufficient conditions to determine stability of convex combinations of polynomials is paramount. In this paper, knowing that Hurwitz polynomials set is not a convex set, a brief overview of some results and open problems concerning the stability of the convex combinations of Hurwitz polynomials is then provided.",

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AU - Villafuerte-Segura, Raúl

AU - Campos-Cantón, Eric

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N2 - In the framework of robust stability analysis of linear systems, the development of techniques and methods that help to obtain necessary and sufficient conditions to determine stability of convex combinations of polynomials is paramount. In this paper, knowing that Hurwitz polynomials set is not a convex set, a brief overview of some results and open problems concerning the stability of the convex combinations of Hurwitz polynomials is then provided.

AB - In the framework of robust stability analysis of linear systems, the development of techniques and methods that help to obtain necessary and sufficient conditions to determine stability of convex combinations of polynomials is paramount. In this paper, knowing that Hurwitz polynomials set is not a convex set, a brief overview of some results and open problems concerning the stability of the convex combinations of Hurwitz polynomials is then provided.

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Open Problems Related to the Hurwitz Stability of Polynomials Segments

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