The semicycles of solutions of delay difference equations

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

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=

Consider the nonautonomous hyperlogistic delay difference equation where {p~} is a sequence of positive real numbers, {k~} a sequence of nonnegative integers such that {n -k=} is nondecreasing, and r a ratio of two odd integers. Our main results give sufficient conditions that guarantee every solut