Bounded oscillation of second-order delay difference equations of unstable type

This paper deals with some sufficient conditions for the bounded oscillation criteria for the second-order nonlinear delay difference equation In addition, we generalize and improve the existing results, and then give some examples of applications.

Sharp sufficient conditions are obtained for the bounded oscillation for second-order delay differential equation with unstable type xH(t) = p(t)x(t -~') in the critical state lira p(t) = t~OO (~) 2003 Elsevier Science Ltd. All rights reserved.

F~t, we prove that the following even-order neutral superlinear delay difference equation with unstable type, -q ..... ,\* > no, (\*) has always unbounded and nonoscillatory solution. Then, some bounded oscillatory criteria for equation (,) are obtained. (

In this paper, we obtain new sufficient conditions for the oscillation of all solutions of the second-order linear difference equation where Axn = xt,+1 --xn is the forward difference operator, {Ph} is a sequence of nonnegative real numbers. Our results improve the know results in the literature.

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.