Dominated splitting from constant periodic data and global rigidity of Anosov automorphisms (Q6614092)

The paper deals with the global periodic data rigidity of generic Anosov automorphisms of \(T^d\). The authors show how to construct a \(Df\)-invariant splitting of \(E^u\) from just the periodic data of \(Df\). The main theorem states the following. Let \(\Sigma\) be a transitive, invertible, subshift of finite type and \({A:\Sigma\to \mathrm{GL}(d,\mathbb{R})}\) be a Holder continuous cocycle with constant periodic data associated to exponents \({\lambda_1\geq\dots\geq\lambda_d}\). If \({\lambda_k>\lambda_{k+1}}\) then \(A\) has a dominated splitting of index \(k\). The authors also consider the case when the periodic data is narrow.