Asymptotic behaviour of nonautonomous difference inclusions

In this paper we present a theorem on asymptotic behavior of \(W(n, x(n))\) where \(x(n)\) is a solution of the difference equation \(x(n+1)=f(n, x(n)), n \in N^{+}\)and \(W(n, x): N^{+} \times R^{d} \rightarrow R^{+}\)is continuous. As applications we discuss examples which cannot be handled by the

For autonomous difference equations with an invariant manifold, conditions are known which guarantee that a solution approaching this manifold eventually behaves like a solution on this manifold. In this paper, we extend the fundamental result in this context to difference equations which are nonaut

this paper, we investigate the asymptotic behaviour of a general class of difference systems which includes ss particular cases the prototype nth order difference system as well ss the systems with finite and infinite delays. Applications dwelling upon the importance of the established results are a