Quotients of dynamical systems and chaos on the Cantor fan

Abstract

Let (X,f) be a dynamical system. Using an equivalence relation on X, we introduce the quotient (X/,f) of the dynamical system (X,f). In the first part of the paper, we give new results about sensitive dependence on initial conditions of (X/,f), transitivity of (X/,f), and periodic points in (X/,f). In the second part of the paper, we use these results to study chaotic functions on the Cantor fan. Explicitly, we study functions f on the Cantor fan C such that (1) (C,f) is chaotic in the sense of Devaney, (2) (C,f) is chaotic in the sense of Robinson but not in the sense of Devaney, and (3) (C,f) is chaotic in the sense of Knutzen but not in the sense of Devaney. We also study chaos on the Lelek fan.

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