A rational difference equation

has presented some invariants for difference equations and systems of difference equations of rational Ž . form with constant and periodic coefficients of certain period . We report that the presented invariants as well as their difference equations can be generalized.

In this paper, the rule for the lengths of positive and negative semicycles of nontrivial solutions of the following fourth-order rational difference equation, where a,b E [0, oo) and the initial values x-3,z-2, x-l,~c0 E (0, co), to successively occur is found to be...,4 +,3-, 1 +, 2-,2 +, 1-, 1 +

We investigate how the behaviour, especially at "ϱ, of continuous real solutions Ž . Ž . Ž . Ž . f t to the equation f t s a f t q h q a f t y h , where a , a , h , h are positive real constants, depends on the values of these parameters. Definitive answers are given, except in certain cases when

In this paper we study the existence of generalized invariants and the periodicity of the positive solutions of max equations, where a n b n are sequences of positive numbers, x -k x -k+1 x 0 ∈ 0 ∞ and k ∈ 2 3 .

In this paper a differential-difference equation is derived by methods related to the inverse scattering transform (PST), which has as its limiting form the nonlinear partial differential equation ut +~LYKU, +6/3u2u, + ~xxx = 0. It is shown that the differential-difference equations which have as li