Induced dynamics of non-autonomous dynamical systems

Abstract

Let f0,∞=\fn\n=0∞ be a sequence of continuous self-maps on a compact metric space X. The non-autonomous dynamical system (X,f0,∞) induces the set-valued system (K(X), f0,∞) and the fuzzified system (F(X),f0,∞). We prove that under some natural conditions, positive topological entropy of (X,f0,∞) implies infinite entropy of (K(X),f0,∞) and (F(X),f0,∞), respectively; and zero entropy of (S1,f0,∞) implies zero entropy of some invariant subsystems of (K(S1),f0,∞) and (F(S1),f0,∞), respectively. We confirm that (K(I), f) and (F(I), f) have infinite entropy for any transitive interval map f. In contrast, we construct a transitive non-autonomous system (I, f0,∞) such that both (K(I), f0,∞) and (F(I), f0,∞) have zero entropy. We obtain that (K(X),f0,∞) is chain weakly mixing of all orders if and only if (F1(X),f0,∞) is so, and chain mixing (resp. h-shadowing and multi-F-sensitivity) among (X,f0,∞), (K(X),f0,∞) and (F1(X),f0,∞) are equivalent, where (F1(X),f0,∞) is the induced normal fuzzification.