On the asymptotic behavior of solutions of higher order nonlinear difference equations

In this paper, we study the boundedness and monotomclty properties of solutions of the difference equation A(r,-l&,-l) + qn(A~n)" -~4 = e,, where {rn}, {q,,}, {p,,}, and {e,} are real sequences and a and p are ratios of odd posltlve integers Examples lllustratmg our results are included

This paper is concerned with the oscillation of solutions of neutral difference equation and the asymptotic behavior of solutions of delay difference equation t E I, where I is the discrete set (0, 1,2,. . . } and A is the forward difference operator Ar(t) = z(t+l) --2(t).

Utilizing the theory of dynamic systems on time scales, which unifi~ the theory of continuous and discrete dynamic systems, a n \_ece~\_\_\_\_ry and sufficient condition m given for the asymptotic behavior of solutions of higher order nonlinear equations.