Global stability for a class of nonlinear nonautonomous delay equations

Consider the following nonautonomous differential equation with a piecewise constant delay: In this paper, using a recent result of a full affirmative answer to the Gopalsamy and Liu's conjecture for the autonomous case of the above equation with a(t) ≡ a ≥ 0 and b(t) ≡ b > 0, we derive three types

Consider the following separable nonlinear delay dlfferentml equation m dy(t) \_\_ E a,(t)g,(y(%(t))), t > to, dt y(t) = ¢(t), t <\_ to, where we assume that, there is a strictly monotone increasing function f(x) on ( -o c , +oe) such that g,(x) In this paper, to the above separable nonlinear dela

zero solution of this equation with unbounded delay to be uniformly stable as well as asymptotically stable.

This paper investigates the global asymptotic stability (GAS) for a class of nonlinear neural networks with multiple delays. Based on Lyapunov stability theory and the linear matrix inequality (LMI) technique, a less conservative delay-dependent stability criterion is derived. The present result is