An example of a genuinely discontinuous generically chaotic transformation of the interval

Józef Piórek

Displaying similar documents to “An example of a genuinely discontinuous generically chaotic transformation of the interval”

A note on generic chaos

Gongfu Liao (1994)

Annales Polonici Mathematici

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We consider dynamical systems on a separable metric space containing at least two points. It is proved that weak topological mixing implies generic chaos, but the converse is false. As an application, some results of Piórek are simply reproved.

The bitransitive continuous maps of the interval are conjugate to maps extremely chaotic a. e.

Babilonová, M. (2000)

Acta Mathematica Universitatis Comenianae. New Series

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Linear combinations of Cantor sets

J. Nymann (1995)

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On random numbers generated by Dynamical systems

Makoto Mori (2009)

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Continuous subadditive processes and formulae for Lyapunov characteristic exponents

Wojciech Słomczyński (1995)

Annales Polonici Mathematici

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Asymptotic properties of various semidynamical systems can be examined by means of continuous subadditive processes. To investigate such processes we consider different types of exponents: characteristic, central, singular and global exponents and we study their properties. We derive formulae for central and singular exponents and show that they provide upper bounds for characteristic exponents. The concept of conjugate processes introduced in this paper allows us to find lower bounds...

On a one-dimensional analogue of the Smale horseshoe

Ryszard Rudnicki (1991)

Annales Polonici Mathematici

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We construct a transformation T:[0,1] → [0,1] having the following properties: 1) (T,|·|) is completely mixing, where |·| is Lebesgue measure, 2) for every f∈ L¹ with ∫fdx = 1 and φ ∈ C[0,1] we have $\int φ (T^{n} x) f (x) d x \to \int φ d μ$ , where μ is the cylinder measure on the standard Cantor set, 3) if φ ∈ C[0,1] then $n^{- 1} \sum_{i = 0}^{n - 1} φ (T^{i} x) \to \int φ d μ$ for Lebesgue-a.e. x.