Note on a nonlinear difference equation with periodic coefficients and constant delays

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-,,

For a class of nonlinear homogeneous difference equations with periodic coefficients, it is shown that every nonoscillatory entire solution has exponential bounds and that the oscillation is equivalent to nonexistence of a part of positive characteristic roots. Sufficient conditions for oscillation

In this paper, we study the existence of almost and quasi-periodic solutions to two classes of second-order di erential equations. As a corollary, it is shown that periodic and unbounded solutions can coexist for the equation x (t) + ! 2 x(t) = bx([t]) + f(t), which is di erent from the case: b = 0.