Bistable boundary conditions implying codimension 2 bifurcations

Abstract

We consider generic families X of smooth dynamical systems depending on parameters ∈ P where P is a 2-dimensional simply connected domain and assume that each X only has a finite number of restpoints and periodic orbits. We prove that if over the boundary of P there is a S or Z shaped bifurcation graph containing two opposing fold bifurcation points while over the rest of the boundary there are no other bifurcation points, then, if there is no fold-Hopf bifurcation in P then there is at least one cusp in the interior of P.