Further oscillation criteria for delay partial difference equations

This paper considers the delay difference equation where p n is a sequence of nonnegative real numbers and k is a positive integer. Some new oscillation criteria for this equation are obtained. Our theorems improve all known results in the literature.

In this paper, some new oscillation criteria are obtained for the first-order delay difference equation k k Xn+I-x,~+ (k+l)k+l xn\_k÷f(n,x,~\_l~,...,xn\_t~) =0, n=0,1,2,..., where k,/1,/2,..., ls are positive integer numbers, f is a function. Our results improve the known results in the literature.

This paper is concerned with the linear delay partial difference equation aAm+l,n+l ~ bAm+l,n ~ cAm,n+1 -dAm,n ~-pm,nAm-a,n-~" = O, where a and ~-are two nonnegative integers, a, b, c, and d are positive constants, and {Pl,j}, i,j ~ No is a double real sequence. Sufficient conditions for this equati

Some new results on oscillation and nonoscillation for delay differential equations with impulses are established. A counterexample is given which shows that a known oscillation criterion is incorrect.