Generalized entropy of induced zero-entropy systems (2503.22944v1)

Abstract: Given a compact metric space $X$ and a continuous map $T: X \to X$, the induced hyperspace map $T_\mathcal{K}$ acts on the hyperspace $\mathcal{K}(X)$ of nonempty closed sets of $X$, and the measure-induced map $T_$ acts on the space of probability measures $\mathcal{M}(X)$. It is proven that a large class of zero-entropy dynamical systems exhibits infinite metric mean dimension in its induced hyperspace map $T_\mathcal{K}$. 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 $T_\mathcal{K}$.