I wonder if the topological entropy as defined by Adler or Bowen can be infinity.
Can you answer that?
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This question is actually answered in an example of Adler's original paper. Let $X$ be any compact Hausdorff space with infinitely many points, let $X^\infty$ be the space of two-sided infinite sequences $(x_n)_{n=-\infty}^\infty$ with $x_n \in X$, equipped with the product topology. Then the shift $\sigma:X^\infty \to X^\infty$, $\sigma((x_n)) = (x_{n+1})$ has infinite entropy.
Lukas Geyer
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