The semicycles of solutions of neutral difference equations

In this paper, we study the semicycles of oscillatory solutions of the delay difference equation Yn+l -Yn + PnYn-k = 0, where {Pn} is a sequence of nonnegative real numbers and k is a positive integer. Upper bound of numbers of terms of semicycles are determined. ~

In this paper, we study the semicycles of oscillatory solutions of nonlinear difference equation with several delays l 77~i i=1 j=l where {Pi(n)} is a real sequence with Pi(n) >\_ 0 for all large n; I, rni, kij are positive integers, c~ij rrl i

The oscillatory behavior of solutions of the neutral difference equations with nonlinear neutral term, is studied in the case when c~ :fi 1. A necessary and sufficient oscillatory conditions for the case 0 < a < 1 and an almost "sharp" oscillatory and nonoseillatory criteria for the case a > i are

In this paper, we study the semicycles of oscillatory solutions of the delay difference equation Yn+1 -Yn 4-Pnyn-k = O, where {Pn} is a sequence of nonnegative real numbers and k is a positive integer. Upper bound of numbers of terms of semicycles are determined in the case when v,>a, a< \V~-~/ ' i=

where k is a positive integer, 0 < c < 1, V denotes the backward difference operator Vyn ---yn -Yn-1, f : N x R 2 --\* R is continuous and decreasing with respect to the second argument. We give the results that solutions of the equation convergent to constants.