@ARTICLE{Mazakov_Talgat_The_2021,
 author={Mazakov, Talgat and Wójcik, Waldemar and Jomartova, Sholpan and Karymsakova, Nurgul and Ziyatbekova, Gulzat and Tursynbai, Aisulu},
 volume={vol. 67},
 number={No 2},
 journal={International Journal of Electronics and Telecommunications},
 pages={155-161},
 howpublished={online},
 year={2021},
 publisher={Polish Academy of Sciences Committee of Electronics and Telecommunications},
 abstract={The article considers the problem of stability of interval-defined linear systems based on the Hurwitz and Lienard- Shipar interval criteria. Krylov, Leverier, and Leverier- Danilevsky algorithms are implemented for automated construction and analysis of the interval characteristic polynomial. The interval mathematics library was used while developing the software. The stability of the dynamic system described by linear ordinary differential equations is determined and based on the properties of the eigenvalues of the interval characteristic polynomial. On the basis of numerical calculations, the authors compare several methods of constructing the characteristic polynomial. The developed software that implements the introduced interval arithmetic operations can be used in the study of dynamic properties of automatic control systems, energy, economic and other non-linear systems.},
 type={Article},
 title={The Stability Interval of the Set of Linear System},
 URL={http://www.czasopisma.pan.pl/Content/118879/PDF/22_2909_W%C3%B3jcik_sk.pdf},
 doi={10.24425/ijet.2021.135958},
 keywords={automatic control system, stability, matrix, minor, characteristic polynomial, Hurwitz criterion, Lienard-Shipard criterion of interval mathematics, Lyapunov function},
}