Existence and Configuration of Invariant Sets in C∞([a,b]) on which the Differential Operator Exhibits Devaney's Chaos
Abstract
In this paper, we investigate the chaotic behavior of the differential operator ddx on the space of smooth functions C∞([a,b]) equipped with the Lp-norm (1 p∞). We explicitly construct a homeomorphism between a subset of C∞([a,b]) and the shift space. Moreover, inspired by symbolic dynamics, we demonstrate that invariant sets, on which the differential operator behaves analogously to the shift, are densely configured in C∞([a,b]). We also prove that the differential operator is chaotic on the entire space C∞([a,b]) using a similar approach.
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