Abstract
We prove that for a large and important class of C¹ twist maps of the torus periodic and quasi-periodic orbits of a new type exist, provided that there are no rotational invariant circles (R.I.C's). These orbits have a non-zero "vertical rotation number'' (V.R.N.), in contrast to what happens to Birkhoff periodic orbits and Aubry-Mather sets. The V.R.N. is rational for a periodic orbit and irrational for a quasi-periodic. We also prove that the existence of an orbit with a V.R.N = a > 0, implies the existence of orbits with V.R.N = b, for all 0 < b < a. And as a consequence of the previous results we get that a twist map of the torus with no R.I.C's has positive topological entropy, which is a very classical result. In the end of the paper we present some applications and examples, like the Standard map, such that our results apply.
Highlights
In this announcement we describe results on the existence and on the structure of some periodic and quasi-periodic orbits of a new type for twist maps of the torus
These orbits exist, if and only if, the twist map does not have rotational invariant circles (R.I.C), and in some important cases they are related to escaping and transport problems
Given a one parameter family Tμ of twist maps of the torus, such that for μ > μ0 there are no R.I.C’s, as a consequence of the break up of the last invariant circle we have, besides many important results that have already been studied by several authors, the appearance of these new type of orbits
Summary
In this announcement we describe results on the existence and on the structure of some periodic and quasi-periodic orbits of a new type for twist maps of the torus. Given a one parameter family Tμ of twist maps of the torus, such that for μ > μ0 there are no R.I.C’s, as a consequence of the break up of the last invariant circle we have, besides many important results that have already been studied by several authors, the appearance of these new type of orbits.
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