Twist Maps of the Annulus: An Abstract Point of View
2023, Volume 28, Numbers 4-5, pp. 343-363
Author(s): Le Calvez P.
Author(s): Le Calvez P.
We introduce the notion of abstract angle at a couple of points defined by two
radial foliations of the closed annulus. We will use for this purpose the digital line topology on
the set ${\mathbb Z}$ of relative integers, also called the Khalimsky topology. We use this notion to give
unified proofs of some classical results on area preserving positive twist maps of the annulus
by using the Lifting Theorem and the Intermediate Value Theorem. More precisely, we will
interpretate Birkhoff theory about annular invariant open sets in this formalism. Then we give
a proof of Mather’s theorem stating the existence of crossing orbits in a Birkhoff region of
instability. Finally we will give a proof of Poincaré – Birkhoff theorem in a particular case, that
includes the case where the map is a composition of positive twist maps.
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