On a System of Two Nonlinear Difference Equations

In this paper we study a general variational stability, introduced mainly for non-autonomous difference systems. Under summability conditions, these systems remain stable for general perturbations.

In this paper, two interesting oscillation criteria are obtained for all solutions of Ž . the nonlinear delay difference equations of the form y y y q p f y s 0, n s 0, 1, 2, . . . . Some applications are given to demonstrate the advantage of results obtained in this paper. Our results also improve

We study a nonlinear wave equation on the two-dimensional sphere with a blowing-up nonlinearity. The existence and uniqueness of a local regular solution are established. Also, the behavior of the solutions is examined. We show that a large class of solutions to the initial value problem quench in f

In this paper we consider the second order nonlinear difference equation Ä 4 nondecreasing, and uf u ) 0 as u / 0, q is a real sequence. Some new n Ž . sufficient conditions for the oscillation of all solutions of 1 are obtained.