Federico Bonneto, Jack Wang, Vishal Kumar
Published 2024-08-07Version 1
In this paper we describe the tangent vectors of the stable and unstable manifold of a class of Anosov diffeomorphisms on the torus $\mathbb{T}^2$ using the method of formal series and derivative trees. We start with linear automorphism that is hyperbolic and whose eigenvectors are orthogonal. Then we study the perturbation of such maps by trigonometric polynomial. It is known that there exist a (continuous) map $H$ which acts as a change of coordinate between the perturbed and unperturbed system, but such a map is in general, not differentiable. By "re-scaling" the parametrization $H$, we will be able to obtain the explicit formula for the tangent vectors of these maps.
On a Smale Conjecture for the existence of fixed points for Anosov diffeomorphisms
Some sufficient conditions for transitivity of Anosov diffeomorphisms
Two remarks on $C^\infty$ Anosov diffeomorphisms
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