A Piecewise Smooth Fermi-Ulam Pingpong with Potential

Abstract

In this paper we study a Fermi-Ulam model where a pingpong bounces elastically against a periodically oscillating platform in a gravity field. We assume that the platform motion f(t) is piecewise C3 with a singularity f(0+)f(1-). If the second derivative of the platform motion is either always positive f(t)>0 or always f(t)<-g where g is the gravitational constant, then the escaping orbits constitute a null set and the system is recurrent. However, under these assumptions, escaping orbits coexist with bounded orbits at arbitrarily high energy level.