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Shub's example revisited
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Shub's example revisited
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For a class of robustly transitive diffeomorphisms on $\mathbb T^4$ introduced by Shub in [24], satisfying an additional bunching condition, we show that there exits a $C^2$ open and $C^r$ dense subset $\mathcal U^r$, $2\leq r\leq\infty$, such that any two hyperbolic points of $g\in \mathcal U^r$ with stable index $2$ are homoclinically related. As a consequence, every $g\in \mathcal U^r$ admits a unique homoclinic class associated to the hyperbolic periodic points with index $2$, and this homoclinic class coincides to the whole ambient manifold. Moreover, every $g\in \mathcal U^r$ admits at most one measure with maximal entropy, and every $g\in\mathcal U^{\infty}$ admits a unique measure of maximal entropy.
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