Oscillation of a class of partial difference equations with unbounded delay

consider the delay difference equation G&+1 -%I + Pnr,(,) = 0, 72 = 0, 1,2, . , where T : N + Z is nondecreasing, 7(n) < n for ra E N and iimn--roo 7(n) = co, {p,} is a nonnegative sequence. Some oscillation criteria for this equation are obtained.

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

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

In this paper, we obtain some new oscillation criteria for the difference equation with several delays which improve the existing results in the literature.

This paper is concerned with the linear delay partial difference equation where {a(i, j)}, {b(i, j)}, {p(i, j)}, i, j E No, are real sequences. Sufficient conditions for this equation to be stable are derived. Some conditions for this equation to be unstable are obtained also.

construct an important transform to obtain sufficient conditions for the oscillation of all solutions of the delay partial difference equations with positive and negative coefficients of the form wf (m>% Am-o+-,, An-w-,,