A new view of the -theory for a system of higher order difference equations

In this paper we study the global behavior of the nonnegative equilibrium points of the difference equation where A, B, C are nonnegative parameters, initial conditions are nonnegative real numbers and k, m are nonnegative integers, m ≤ 2k + 1. Also we derive solutions of some special cases of this

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).

On the basis of the higher order Boussinesq equations derived by the author (1999), a new form of higher order Boussinesq equations is developed through replacing the depth-averaged velocity vector by a new velocity vector in the equations in order to increase the accuracy of the linear dispersion,

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