Sequence entropy and independence in free and minimal actions

Abstract

For every countable infinite group that admits Z as a homomorphic image, we show that for each m∈N, there exists a minimal action whose topological sequence entropy is (m). Furthermore, for every countable infinite group G that contains a finite index normal subgroup G' isomorphic to Zr, and for every m∈ N, we found a free minimal action with topological sequence entropy (n), where m≤ n≤ m2r[G:G']. In both cases, we also show that the aforementioned minimal actions admit non-trivial independence tuples of size n but do not admit non-trivial independence tuples of size n+1 for some n≥ m.

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