Lyapunov exponents everywhere and rigidity
Abstract
In the present work we obtain rigidity results analysing the set of regular points, in the sense of Oseledec's Theorem. It is presented a study on the possibility of an Anosov diffeomorphisms having all Lyapunov exponents defined everywhere. We prove that this condition implies local rigidity of an Anosov automorphism of the torus Td, d ≥ 3, C1-close to a linear automorphism diagonalizable over R and such that its characteristic polynomial is irreducible over Q.
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