Generalized entropy of induced zero-entropy systems

Abstract

Given a compact metric space X and a continuous map T: X X, the induced hyperspace map TK acts on the hyperspace K(X) of nonempty closed sets of X, and the measure-induced map T* acts on the space of probability measures M(X). It is proven that a large class of zero-entropy dynamical systems exhibits infinite metric mean dimension in its induced hyperspace map TK. This work also builds on the concept of generalized entropy, which is fundamental for studying the complexity of zero-entropy systems. Lower bounds of the generalized entropy of the measure-induced map T* are established, assuming that the base system T has zero topological entropy. Moreover, upper bounds of the generalized entropy are explicitly computed for the measure-induced map of the Morse-Smale diffeomorphisms on the circle. Finally, it is shown that the generalized entropy of T* is a lower bound for the generalized entropy of TK.

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