The first‐order difference equation xn+1 = f(xn), n = 0,1,…, where f: R → R, is referred as an one‐dimensional discrete dynamical system. If function f is a chaotic mapping, then we talk about chaotic dynamical system. Models with chaotic mappings are not predictable in long‐term. In this paper we consider family of chaotic mappings in symbol space S2. We use the idea of topological semi‐conjugacy and so we can construct a family of mappings in the unit segment such that it is chaotic.
Bula, I., & Rumbeniece, I. (2010). Construction of chaotic dynamical system. Mathematical Modelling and Analysis, 15(1), 1-8. https://doi.org/10.3846/1392-6292.2010.15.1-8
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