Details

Title

Robust stability of a class of uncertain fractional order linear systems with pure delay

Journal title

Archives of Control Sciences

Yearbook

2015

Issue

No 2

Authors

Divisions of PAS

Nauki Techniczne

Publisher

Committee of Automatic Control and Robotics PAS

Date

2015[2015.01.01 AD - 2015.12.31 AD]

Identifier

DOI: 10.1515/acsc-2015-0011 ; ISSN 1230-2384

Source

Archives of Control Sciences; 2015; No 2

References

Mesbahiand (2013), Stability of linear time invariant fractional delay systems of retarded type in the space of delay parameters, Automatica, 49, 1287, doi.org/10.1016/j.automatica.2013.01.041 ; Busłowicz (2008), Stability of linear continuous - time fractional order systems with delays of the retarded type, Bull Pol Acad Sci Techn, 56, 319. ; Kaczorek (2012), Determination of positive realizations with reduced numbers of delays or without delays for discrete - time linear systems Archives of Control, Sciences, 22, 371. ; Busłowicz (2014), Stability conditions of continuous - time fractional order linear systems with pure delay Submitted for publication inBull, Pol Acad Sci Techn. ; Li (2014), Stability analysis of fractional order systems with time delay of Mathematical Computational Science and, Int J Engineering, 8, 400. ; Fioravanti (2012), A numerical method for stability windows and unstable root - locus calculation for linear fractional time - delay systems, Automatica, 48, 2824, doi.org/10.1016/j.automatica.2012.04.009 ; Desoerand (1975), Feedback Systems : Input - output Properties New York, Acad. ; Kaslikand (2012), Analytical and numerical methods for the stability analysis of linear fractional delay differential equations of Computational and Applied, Mathematics, 16, 236. ; Ruszewski (2014), Practical stability and asymptotic stability of interval fractional discrete - time linear state - space system In Recent Advances in Automation , Robotics and Measuring Techniques ( Advances in Intelligent Systems and, Computing, 267. ; Busłowicz (1992), Asymptotic stability of dynamical interval systems with pure delay Scientific Bialystok University of Technology Technical Electricity, Sciences, 11, 83.
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