On exponential stability of nonlinear Volterra difference equations in phase spaces

Abstract: Using a novel approach, we present some new explicit criteria for global exponential stability of the zero solution of general nonlinear Volterra difference equations in phase spaces. In particular, this gives a solution to an open problem posed very recently by E. Braverman and I. M. Karabash in Journal of Difference Equations and Applications 18, 909–939 (2012). As an application, we apply the obtained results to study asymptotic behavior of equilibriums of discrete time neural networks.

“…The corresponding stability (necessary for the analysis of time systems) is often a significant matter. Recently, problems of exponential stability for differential systems have attracted the attention of many researchers, as it results from the references [15][16][17][18][19]. It is noteworthy that the results in all aforementioned works concern only the stability of solutions of differential equations.…”

Unique solvability and exponential stability of differential hemivariational inequalities

“…The corresponding stability (necessary for the analysis of time systems) is often a significant matter. Recently, problems of exponential stability for differential systems have attracted the attention of many researchers, as it results from the references [15][16][17][18][19]. It is noteworthy that the results in all aforementioned works concern only the stability of solutions of differential equations.…”

Unique solvability and exponential stability of differential hemivariational inequalities

A discrete Gronwall–Halanay-type inequality with infinite delay and its applications to difference equations