Oscillation for difference equations with continuous variable

This paper is concerned with the delay partial difference equation where p is a real number, a and r are nonnegative real numbers. Sufficient and necessary conditions for all continuous solutions of this equation to be oscillatory are obtained. Explicit condition for oscillation in terms of p, a, a

## In this paper, we obtain some sharp conditions for oscillation and nonoscillation of the difference equation with variable delays where m is a positive integer, {ki(n)}r=,, and {pi(n)}~& (i = 1,2,. , m) are sequences of positive integers and real numbers, respectively. Our results improve and e

This paper is devoted to a class of linear impulsive partial difference equations with continuous variables. We establish a difference inequality without impulses, and use it to obtain various sufficient conditions for the oscillation of solutions.

In this paper, we are mainly concerned with the second order nonlinear difference equation with continuous variable. Here, by using the iterated integral transformations, generalized Riccati transformations, and integrating factors, we give some oscillatory criteria for this equation.

For the partial difference equations ## A(x -a, y) -F A(x, y -b) -A(x, y) + P(x, y)A(x + T, y + a) = 0 and A(x -a, y) + A(x, y -b) -A(x, y) ~-f(x, y, A(x T •, y + q)) = O, we shall obtain sufficient conditions for the oscillation of all solutions of these equations. (~) 2001 Elsevier Science Ltd.