Paper Info
Title
Admissibility and stabilization of singular continuous 2D systems described by Roesser model
Abstract
The paper considers first, the admissibility conditions for continuous 2D systems represented by Roesser model by dealing with non-strict LMIs. Secondly, admissibility and stabilization conditions using strict LMIs conditions are investigated. For these strict LMIs conditions, necessary and sufficient conditions can be directly solved with LMI toolbox since they are more traceable and reliable in numerical simulation than non-strict conditions presented in the first part of the paper, that are extracted basing on existed results. Finally, a real plant model of a transmission line is used to validate the proposed theoretical results.
Year
DOI
Venue
2020
10.1007/s11045-019-00681-4
Multidimensional Systems and Signal Processing
Keywords
DocType
Volume
2D systems, Singular systems, Stability, Stabilization, Admissibility, Linear matrix inequality (LMI)
Journal
31
Issue
ISSN
Citations 
2
0923-6082
0
PageRank 
References 
Authors
0.34
0
3
Name
Order
Citations
PageRank
Laila Dami100.34
Mohamed Benhayoun2654.61
Abdellah Benzaouia324625.20