A second order analysis of the periodic solutions for nonlinear periodic differential systems with a small parameter

We analyse the behaviour of the solution for a small parameter of some nonlinear di erential systems for which the linearized system admits periodic solutions. We obtain the normal variation system, which allows the study of stability of the transformed system, as well as several considerations on t

We extend to difference equations the classical method of harmonic balance. We show that the method can be used to obtain an approximation to the periodic solutions of a special class of second-order nonlinear di$erence equations containing a small parameter. Two examples illustrating the method are

By employing the Deimling fixed point index theory, we consider a class of second-order nonlinear differential systems with two parameters (λ, µ) ∈ R 2 + \ {(0, 0)}. We show that there exist three nonempty subsets of R 2 + \ {(0, 0)}: Γ , ∆ 1 and ∆ 2 such that R 2 + \ {(0, 0)} = Γ ∪ ∆ 1 ∪ ∆ 2 and th