Rigidity for Some Cases of Anosov Endomorphisms of Torus

Abstract

We obtain smooth conjugacy between non-necessarily special Anosov endomorphisms in the conservative case. Among other results, we prove that a strongly special C∞-Anosov endomorphism of T2 and its linearization are smoothly conjugated since they have the same periodic data. Assuming that for a strongly special C∞-Anosov endomorphism of T2 every point is regular (in Oseledec's Theorem sense), then we obtain again smooth conjugacy with its linearization. We also obtain some results on local rigidity of linear Anosov endomorphisms of d-torus, where d ≥ 3, under periodic data assumption. The study of differential equations defined on invariant leaves plays an important role in rigidity problems such as those treated here.