Stability of Quasi-Periodic Orbits in Recurrent Neural Networks

In this paper we introduce recurrent dimensions of discrete dynamical systems and we give upper and lower bounds of the recurrent dimension of the quasi-periodic orbits. We show that these bounds have different values according to the algebraic properties of the frequency and we investigate these di

## Abstract This paper proposes a class of more general model of recurrent neural networks with __functional__ delay, which has been found more suitable to apply directly. Simple and easily checkable conditions of existence, uniqueness, and global exponential stability of periodic solution for the

we consider a nonlinear discrete-time system 4n + 1) = k(n) + g(y(n -k)), Y(n + 1) = Dy(n) -g(4n -k)), n E N, arising as a discrete-time network of two neurons with McCulloch-Pitts nonlinearity, where p E (0, l), k is a positive integer, and g is a signal transmission function with a threshold 6. W

In this paper recurrent neural networks with time-varying delays and continuously distributed delays are considered. Sufficient conditions for the existence and exponential stability of the anti-periodic solutions are established, which are new and complement previously known results.