Open AccessStability of Uncertain 2-D Discrete Systems in Presence of Generalized Overflow Nonlinearities
Author(s) -
S.B. Pandeya,
Siva Kumar Tadepalli,
V. Krishna Rao Kandanvli,
Siva Kumar Tadepalli
Publication year - 2019
Publication title -
international journal of engineering and advanced technology
Language(s) - English
Resource type - Journals
ISSN - 2249-8958
DOI - 10.35940/ijeat.f1134.0986s319
Subject(s) - stability (learning theory) , nonlinear system , control theory (sociology) , mathematics , regular polygon , state space , work (physics) , variable (mathematics) , computer science , mathematical analysis , engineering , control (management) , statistics , physics , mechanical engineering , geometry , quantum mechanics , machine learning , artificial intelligence
Stability analysis of two-dimensional (2-D) discontinuous systems with generalized overflow nonlinear effects is considered in this work. The 2-D models considered are the well-known Fornasini Marchesini Second Local State-Space (FMSLSS) model and the Roesser model. The effect of uncertainties and interim-like variable time-delays on the system is also examined in the study. Using reciprocally convex approach we provide stability criteria which is organized as matrix inequalities. Numerical illustrations are given to demonstrate the applicability of the results.