On the stability of 2D general Roesser Lyapunov systems | Zendy

Mohammed Amine Ghezzar | Zendy; Djillali Bouagada | Zendy; Kamel Benyettou | Zendy; Mohammed Chadli | Zendy; Paul Van Dooren | Zendy

AI Assistant Blog Pricing

Home ZAIA Blog

Open Access

On the stability of 2D general Roesser Lyapunov systems

Author(s) -

Mohammed Amine Ghezzar,

Djillali Bouagada,

Kamel Benyettou,

Mohammed Chadli,

Paul Van Dooren

Publication year - 2021

Publication title -

mathematica

Language(s) - English

Resource type - Journals

SCImago Journal Rank - 0.294

H-Index - 6

eISSN - 2601-744X

pISSN - 1222-9016

DOI - 10.24193/mathcluj.2021.1.08

Subject(s) - mathematics , lyapunov function , stability (learning theory) , exponential stability , linear matrix inequality , control theory (sociology) , lyapunov equation , discrete time and continuous time , matrix (chemical analysis) , mathematical optimization , nonlinear system , computer science , control (management) , physics , statistics , quantum mechanics , machine learning , artificial intelligence , materials science , composite material

This paper addresses the problem of stability for general two-dimensional (2D) discrete-time and continuous-discrete time Lyapunov systems, where the linear matrix inequalities (LMI's) approach is applied to derive a new sufficient condition for the asymptotic stability.

The content you want is available to Zendy users.

Already have an account? Click here to sign in.

Having issues? You can contact us here

Accelerating Research