Tangent Space of the Stable And Unstable Manifold of Anosov Diffeomorphism on 2-Torus

arXiv - MATH - Dynamical Systems Pub Date : 2024-08-07 DOI:arxiv-2408.03607
Federico Bonneto, Jack Wang, Vishal Kumar
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Abstract

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.
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2-Torus 上阿诺索夫衍射的稳定与不稳定漫域的切线空间
在本文中,我们用形式数列和导数树的方法描述了环$\mathbb{T}^2$上一类阿诺索夫差分形的稳定和不稳定manifold的切向量。我们从双曲且特征向量正交的线性自形变开始。然后用三角多项式研究这种映射的扰动。众所周知,存在一个(连续的)映射 $H$,它在扰动系统和未扰动系统之间起着改变坐标的作用,但这种映射一般是不可分的。通过 "重新缩放 "参数 H$,我们将能得到这些映射的切向量的明确公式。
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arXiv - MATH - Dynamical Systems
arXiv - MATH - Dynamical Systems
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