The Ambrosetti-Prodi periodic problem: Different routes to complex dynamics

Abstract

We consider a second order nonlinear ordinary differential equation of the form u'' + f(u) = p(t) where the forcing term p(t) is a T-periodic function and the nonlinearity f(u) satisfies the properties of Ambrosetti-Prodi problems. We discuss the existence of infinitely many periodic solutions as well as the presence of complex dynamics under different conditions on p(t) and by using different kinds of approaches. On the one hand, we exploit the Melnikov's method and, on the other hand, the concept of "topological horseshoe".