Topological entropy of nonautonomous dynamical systems on uniform spaces

Abstract

In this paper, we focus on some properties, calculations and estimations of topological entropy for a nonautonomous dynamical system (X,f0,∞) generated by a sequence of continuous self-maps f0,∞=\fn\n=0∞ on a compact uniform space X. We obtain the relations of topological entropy among (X, f0,∞), its k-th product system and its n-th iteration system. We confirm that the entropy of (X, f0,∞) equals to that of f0,∞ restricted to its non-wandering set provided that f0,∞ is equi-continuous. We prove that the entropy of (X, f0,∞) is less than or equal to that of its limit system (X, f) when f0,∞ converges uniformly to f. We show that two topologically equi-semiconjugate systems have the same entropy if the equi-semiconjugacy is finite-to-one. Finally, we derive the estimations of upper and lower bounds of entropy for an invariant subsystem of a coupled-expanding system associated with a transition matrix.