Global asymptotic stability for a nonlinear delay difference equation

A necessary and sufficient condition for the existence of a bounded nonoscillatory solution is given.

We shall obtain sufficient conditions for the uniform stability and the global asymptotic stability of the linear difference equation with variable delay where {Pn} is a sequence of nonnegative real numbers, {kn} is a sequence of nonnegative integers, and there exists a nonnegative integer k such t

In this paper, we give sufficient conditions under which every solution of the nonlinear difference equation with variable delay tends to zero as n --+ c<). Here, {Pn} is a nonnegative sequence, f : R --+ R is a continuous function with xf(x) > 0 if x ~ 0, and g : N --~ Z is nondecreasing and satis

This paper studies the global existence of solutions of the second order nonlinear neutral delay difference equation with respect to all b ∈ R. A few results on global existence of uncountably many bounded nonoscillatory solutions are established for the above difference equation. Several nontrivia