Stability of a class of delay-difference equations

This paper is concerned with the linear delay partial difference equation where {a(i, j)}, {b(i, j)}, {p(i, j)}, i, j E No, are real sequences. Sufficient conditions for this equation to be stable are derived. Some conditions for this equation to be unstable are obtained also.

In this paper we obtain a necessary and sufficient condition for the asymptotic stability of the zero solution of the linear delay difference equation N x y x q p x s 0, n s 0, 1, 2, . . . , Ý nq 1 n n ykqŽ jy1.l js1 by using root-analysis for the characteristic equation. Here, p is a real number an

We consider the following non-autonomous and nonlinear difference equations with unbounded delays: -∞ < j ≤ 0, where 0 < q < 1 and f j (x) (0 ≤ j < +∞) are suitable functions. We establish sufficient conditions for the zero solution of the above equation to be globally asymptotically stable. These