Anosov diffeomorphisms (Q489917)

The paper explicitly constructs a one-to-one correspondence between \(C^{1^+}\) conjugacy classes of \(C^{1^+}\) Anosov diffeomorphisms on the \(2\)-torus and pairs of \(C^{1^+}\) stable and unstable self-renormalizable sequences. All of the smooth information of the foliations of \(C^{1^+}\) Anosov diffeomorphisms is encoded in the one-dimensional smooth self-renormalizable sequences. The one-to-one correspondence is an extension of earlier work for hyperbolic diffeomorphisms on surfaces done by two of the authors. This extension makes use of the Adler-Tresser-Worfolk decomposition of linear Anosov diffeomorphisms of the \(2\)-torus [\textit{R. Adler} et al., Trans. Am. Math. Soc. 349, No. 4, 1633--1652 (1997; Zbl 0947.37027)]. Another one-to-one correspondence is explicitly constructed between \(C^{1^+}\) conjugacy classes of Anosov diffeomorphisms on the \(2\)-torus and pairs of \(C^{1^+}\) circle diffeomorphisms that are \(C^{1^+}\) periodic points of renormalization with respect to certain \(C^{1^+}\) structures.