4.I.7A

Dynamical Systems | Part II, 2008

Let F:IIF: I \rightarrow I be a continuous one-dimensional map of an interval IRI \subset \mathbb{R}. State when FF is chaotic according to Glendinning's definition.

Prove that if FF has a 3 -cycle then F2F^{2} has a horseshoe.

[You may assume the Intermediate Value Theorem.]

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