Invariant and attracting sets of Volterra difference equations with delays

The aim of this paper is to study the invariant and attracting sets of impulsive delay difference equations with continuous variables. Some criteria for the invariant and attracting sets are obtained by using the decomposition approach and delay difference inequalities with impulsive initial conditi

The aim of this paper is to study the invariant and attracting set of fuzzy cellular neural networks with variable delays. Based on a delayed differential inequality and the properties fuzzy logic operation and M-matrix, the invariant and attracting set is obtained. Moreover, two examples are given

In this paper, a nonlinear and nonautonomous impulsive stochastic functional differential equation is considered. By establishing an L-operator differential inequality and stochastic analysis technique, we obtain the p-attracting set and p-invariant set of the impulsive stochastic functional differe

Consider the nonautonomous delay logistic difference equation /kyn=pnyn(1--Yn~k'-"--~"), n=0,1 ..... (1.1) where {Pn}n>\_o is a sequence of nonnegative real numbers, {kn}n>\_o is a sequence of positive integers, {n -kn) is nondecreasing, limn--.co(n -kn) --vo, and ,k is a positive constant. We obta