Sensitive group actions on regular curves of almost ≤ n order
Abstract
Let X be a regular curve and n be a positive integer such that for every nonempty open set U⊂ X, there is a nonempty connected open set V⊂ U with the cardinality |∂X(V)|≤ n. We show that if X admits a sensitive action of a group G, then G contains a free subsemigroup and the action has positive geometric entropy. As a corollary, X admits no sensitive nilpotent group action.
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