Asymptotic behavior of Morris–Lecar system

The Morris-Lecar equations explicitly modeling the flow of potassium and calcium ions are a two-dimensional description of neuronal spike dynamics. Some research shows that two coupled Morris-Lecar equations can be synchronized, and synchronization takes place regardless of the initial condition if

We establish asymptotic formulae for the solutions of the first order recurrence system x n+1 =(A+B n ) x n , where A and B n (n=0, 1, ...) are square matrices and n=0 &B n & 2 < . As a consequence, we confirm a recent conjecture about the asymptotic behavior of the solutions of the higher order sca

In this paper we study a general variational stability, introduced mainly for weakly stable difference systems. Moreover, we obtain asymptotic formulae for these systems, which state new results about asymptotic behavior for perturbed systems under general hypotheses.

This paper is concerned with a delay difference system where Ic is a positive integer, and f is a signal transmission function of McCulloch-Pitts type. The difference system (\*) can be regarded as the discrete analog of the artifical neural network of two neurons with McCulloch-Pitts nonlinearity.