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Reachable set estimation for discrete-time T-S fuzzy singular systems based on Piecewise Lyapunov function

Conference Paper


Abstract


  • This paper is concerned with the problem of reachable set estimation for discrete-time T-S fuzzy singular systems with bounded input disturbances. Based on the Piecewise Lyapunov Function (PLF) method, a improved sufficient condition is established in terms of Linear Matrix Inequalities (LMIs) to guarantee that the reachable set of discrete-time T-S fuzzy singular systems are bounded by the intersection of ellipsoids. A numerical example is provided to demonstrate the effectiveness of the proposed method in this paper.

Publication Date


  • 2018

Citation


  • Li, J., Shi, J., & Feng, Z. (2018). Reachable set estimation for discrete-time T-S fuzzy singular systems based on Piecewise Lyapunov function. In Proceedings of the 30th Chinese Control and Decision Conference, CCDC 2018 (pp. 2189-2193). doi:10.1109/CCDC.2018.8407489

Scopus Eid


  • 2-s2.0-85050864309

Web Of Science Accession Number


Start Page


  • 2189

End Page


  • 2193

Abstract


  • This paper is concerned with the problem of reachable set estimation for discrete-time T-S fuzzy singular systems with bounded input disturbances. Based on the Piecewise Lyapunov Function (PLF) method, a improved sufficient condition is established in terms of Linear Matrix Inequalities (LMIs) to guarantee that the reachable set of discrete-time T-S fuzzy singular systems are bounded by the intersection of ellipsoids. A numerical example is provided to demonstrate the effectiveness of the proposed method in this paper.

Publication Date


  • 2018

Citation


  • Li, J., Shi, J., & Feng, Z. (2018). Reachable set estimation for discrete-time T-S fuzzy singular systems based on Piecewise Lyapunov function. In Proceedings of the 30th Chinese Control and Decision Conference, CCDC 2018 (pp. 2189-2193). doi:10.1109/CCDC.2018.8407489

Scopus Eid


  • 2-s2.0-85050864309

Web Of Science Accession Number


Start Page


  • 2189

End Page


  • 2193