arXiv:math/0212345 Abstract

arXiv:math/0212345 [math.DS]Abstract References Reviews Resources

Stable ergodicity of certain linear automorphisms of the torus

Published 2002-12-26Version 1

We prove that some ergodic linear automorphisms of $\T^N$ are stably ergodic, i.e. any small perturbation remains ergodic. The class of linear automorphisms we deal with includes all non-Anosov ergodic automorphisms when N=4 and so, as a corollary, we get that every ergodic linear automorphism of $\T^N$ is stably ergodic when $N\leq 5$.

Categories: math.DS

Keywords: stable ergodicity, ergodic linear automorphism, small perturbation remains ergodic, stably ergodic, non-anosov ergodic automorphisms

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arXiv:math/0212345 [math.DS]Abstract References Reviews Resources

Stable ergodicity of certain linear automorphisms of the torus

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Stable ergodicity of certain linear automorphisms of the torus

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arXiv:math/0212345 [math.DS]Abstract References Reviews Resources