A consequence of the growth of rotation sets for families of diffeomorphisms of the torus

Abstract

In this paper we consider C∞ -generic families of area-preserving diffeomorphisms of the torus homotopic to the identity and their rotation sets. Let ft:T2→ T2 be such a family, ft: I R2 → I R2 be a fixed family of lifts and (ft) be their rotation sets, which we assume to have interior for t in a certain open interval I. We also assume that some rational point ( pq, rq)∈ ∂ (ft) for a certain parameter t∈ I and we want to understand consequences of the following hypothesis: For all t>t, t∈ I, ( pq, rq)∈ int(∂ (ft)). Under these very natural assumptions, we prove that there exists a ftq-fixed hyperbolic saddle Pt such that its rotation vector is ( pq, rq) and, there exists a sequence ti>t, ti→ t, such that if Pt is the continuation of Pt with the parameter, then Wu(Pti) (the unstable manifold) has quadratic tangencies with Ws(Pti)+(c,d) (the stable manifold translated by (c,d)), where Pti is any lift of Pti to the plane, in other words, Pti is a fixed point for (fti)q-(p,r), and (c,d)≠ (0,0) are certain integer vectors such that Wu(Pt) do not intersect Ws(Pt)+(c,d). And these tangencies become transverse as t increases.