Approach to the Stability Analysis of Partial Equilibrium States of Nonlinear Discrete Systems

Abstract: A nonlinear system of finite-difference equations of a general form, which admits a partial (in part of variables) zero equilibrium position, is considered. An approach to studying the stability of this equilibrium position is described, based on a preliminary study of stability in a part of the variables determining it based on the Lyapunov function method, followed by an analysis of the structural form of the system. To expand the possibilities of this approach, it is proposed to correct the area in which the Lyapunov function is constructed; this is achieved by introducing a second (vector, generally speaking) auxiliary function. Examples are given that show the features of this approach. © 2022, Pleiades Publishing, Ltd.

Authors
Vorotnikov V.I. 1 , Martyshenko Y.G.2
Number of issue
3
Language
English
Pages
348-359
Status
Published
Volume
61
Year
2022
Organizations
  • 1 Sochi Institute, People’s Friendship University, Sochi, 354340, Russian Federation
  • 2 Russian State University of Oil and Gas, Moscow, 119991, Russian Federation
Keywords
Difference equations; Nonlinear equations; System stability; Auxiliary functions; Equilibrium positions; Equilibrium state; Finite difference equations; Lyapunov function method; Lyapunov's functions; Nonlinear discrete system; Partial equilibrium; Stability analyze; Structural form; Lyapunov functions
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