A versatile class of prototype dynamical systems for complex bifurcation cascades of limit cycles

Abstract

We introduce a versatile class of prototype dynamical systems for the study of complex bifurcation cascades of limit cycles, including bifurcations breaking spontaneously a symmetry of the system, period doubling bifurcations and transitions to chaos induced by sequences of limit cycle bifurcations. The prototype system consist of a 2d-dimensional dynamical system with friction forces f(V(x)) functionally dependent exclusively on the mechanical potential V(x), which is typically characterized, here, by a finite number of local minima. We present examples for d=1,2 and simple polynomial friction forces f(V), where the zeros of f(V) regulate the relative importance of energy uptake and dissipation respectively, serving as bifurcation parameters. Starting from simple Hopf- and homoclinic bifurcations, complex sequences of limit cycle bifurcation are observed when energy uptake gains progressively in importance.