Topological entropy of compact subsystems of transitive real line maps
Abstract
For a continuous map f from the real line (half-open interval [0,1)) into itself let ent(f) denote the supremum of topological entropies of f|K, where K runs over all compact f-invariant subsets of R ([0,1), respectively). It is proved that if f is topologically transitive, then the best lower bound of ent(f) is 3 ( 3, respectively) and it is not attained. This solves a problem posed by C\'anovas [Dyn. Syst. 24 (2009), no. 4, 473--483].
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