New results on global exponential stability for impulsive cellular neural networks with any bounded time-varying delays
From MaRDI portal
Publication:1931004
DOI10.1016/j.mcm.2011.09.009zbMath1255.93103OpenAlexW1970927823MaRDI QIDQ1931004
Publication date: 24 January 2013
Published in: Mathematical and Computer Modelling (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.mcm.2011.09.009
Lyapunov functionglobal exponential stabilityRazumikhin techniquetime-varying delaysimpulsive cellular neural networks
Related Items (30)
The \(p\)th moment exponential stability of stochastic cellular neural networks with impulses ⋮ Stability criteria of nonlinear impulsive differential equations with infinite delays ⋮ Improved stability criteria for a class of neural networks with variable delays and impulsive perturbations ⋮ Impulsive SICNNs with chaotic postsynaptic currents ⋮ Global stability of Clifford-valued recurrent neural networks with time delays ⋮ Globally exponential stability of delayed impulsive functional differential systems with impulse time windows ⋮ A Halanay-type inequality approach to the stability analysis of discrete-time neural networks with delays ⋮ New stability results of neutral-type neural networks with continuously distributed delays and impulses ⋮ Exponential stability of non-autonomous neural networks with heterogeneous time-varying delays and destabilizing impulses ⋮ Global exponential stability for quaternion-valued recurrent neural networks with time-varying delays ⋮ Exponential stability and periodic solutions of impulsive neural network models with piecewise constant argument ⋮ Impulsive control for the synchronization of chaotic systems with time delay ⋮ A spectral radius-based global exponential stability for Clifford-valued recurrent neural networks involving time-varying delays and distributed delays ⋮ On the practical stability of impulsive differential equations with infinite delay in terms of two measures ⋮ Weighted pseudo-almost periodic functions on time scales with applications to cellular neural networks with discrete delays ⋮ Global exponential stability for DCNNs with impulses on time scales ⋮ Global asymptotic stability of impulsive CNNs with proportional delays and partially Lipschitz activation functions ⋮ Recent progress in impulsive control systems ⋮ Existence and global convergence of periodic solutions in recurrent neural network models with a general piecewise alternately advanced and retarded argument ⋮ A white-headed langurs impulsive state feedback control model with sparse effect and continuous delay ⋮ Stability analysis of quaternion-valued neural networks with both discrete and distributed delays ⋮ Stability analysis of nonlinear time-delayed systems with application to biological models ⋮ Existence and global exponential stability of equilibrium for impulsive cellular neural network models with piecewise alternately advanced and retarded argument ⋮ A new switching control for finite-time synchronization of memristor-based recurrent neural networks ⋮ Global asymptotic stability of CNNs with impulses and multi-proportional delays ⋮ Decomposition approach to the stability of recurrent neural networks with asynchronous time delays in quaternion field ⋮ Input-to-state stability of discrete-time delay systems with delayed impulses ⋮ On exponential stability of neural networks with proportional delays and periodic distribution impulsive effects ⋮ Exponential stability of impulsive discrete-time systems with infinite delays ⋮ Stability analysis of high-order Hopfield-type neural networks based on a new impulsive differential inequality
Cites Work
- New results on exponential attractivity of multiple almost periodic solutions of cellular neural networks with time-varying delays
- On global exponential stability for impulsive cellular neural networks with time-varying delays
- Global exponential stability of impulsive high-order bam neural networks with time-varying delays
- Stability of impulsive functional differential equations
- Global exponential stability for impulsive cellular neural networks with time-varying delays
- Global exponential stability of impulsive high-order Hopfield type neural networks with delays
- Asymptotic stability of impulsive high-order Hopfield type neural networks
- A unified synchronization criterion for impulsive dynamical networks
- Exponential stability of impulsive cellular neural networks with time delay via Lyapunov functionals
- Global exponential stability results for neutral-type impulsive neural networks
- Exponential stability of impulsive high-order cellular neural networks with time-varying delays
- Continuous-time additive Hopfield-type neural networks with impulses.
- Global asymptotic stability of high-order Hopfield type neural networks with time delays
- Global stability of cellular neural networks with constant and variable delays
- Stability of artificial neural networks with impulses
- Impulsive stabilization of second-order delay differential equations
- Exponential stability and periodicity of cellular neural networks with time delay
- IMPULSIVE STABILIZATION OF CELLULAR NEURAL NETWORKS WITH TIME DELAY VIA LYAPUNOV FUNCTIONALS
- Cellular neural networks: theory
- Stability and dynamics of delay-type general and cellular neural networks
- On stability of cellular neural networks with delay
- Further results on the stability of delayed cellular neural networks
This page was built for publication: New results on global exponential stability for impulsive cellular neural networks with any bounded time-varying delays
