A Chaotic Function with Some Extremal Properties
From MaRDI portal
Publication:3218328
DOI10.2307/2044350zbMath0555.26003OpenAlexW4248639153MaRDI QIDQ3218328
Publication date: 1983
Published in: Proceedings of the American Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.2307/2044350
Lua error in Module:PublicationMSCList at line 37: attempt to index local 'msc_result' (a nil value).
Related Items (35)
A characterization of chaos ⋮ Packing Entropy of Saturated Sets for Nonuniformly Hyperbolic Systems ⋮ Chaos caused by a strong-mixing measure-preserving transformation ⋮ A chaotic function with a distributively scrambled set of full Lebesgue measure ⋮ The life and mathematics of Jaroslav Smítal ⋮ Cardinalities of scrambled sets and positive scrambled sets ⋮ Continuous chaotic functions of an interval have generically small scrambled sets ⋮ On \(n\)-scrambled sets ⋮ There are no chaotic mappings with residual scrambled sets ⋮ Specification property and distributional chaos almost everywhere ⋮ Every chaotic interval map has a scrambled set in the recurrent set ⋮ LI-Yorke's scrambled sets have measure 0 ⋮ AN ALMOST EVERYWHERE VERSION OF SMÍTAL’S ORDER–CHAOS DICHOTOMY FOR INTERVAL MAPS ⋮ The Hausdorff measure of chaotic sets of adjoint shift maps ⋮ Furstenberg family and chaos ⋮ Chaotic and topological properties of continued fractions ⋮ Positive Measure Scrambled Sets of Some Chaotic Functions ⋮ Extreme Chaos and Transitivity ⋮ A Chaotic Function Possessing a Scrambled Set with Positive Lebesgue Measure ⋮ Are chaotic functions really chaotic ⋮ The Hausdorff dimension of chaotic sets for interval self-maps ⋮ Chaos for subshifts of finite type ⋮ On the Lebesgue measure of Li-Yorke pairs for interval maps ⋮ Invariant scrambled sets and distributional chaos ⋮ Chaos via Furstenberg family couple ⋮ A note on the map with the whole space being a scrambled set ⋮ Stronger forms of transitivity and sensitivity for nonautonomous discrete dynamical systems and Furstenberg families ⋮ On Scrambled Sets for Chaotic Functions ⋮ Unnamed Item ⋮ Distributional chaos revisited ⋮ Chaotic sets of shift and weighted shift maps ⋮ On the measure of scrambled sets of tree maps with zero topological entropy ⋮ Chaotic sets of continuous and discontinuous maps ⋮ The chaotic behavior of a mixing measure-preserving transformation ⋮ Recent development of chaos theory in topological dynamics
This page was built for publication: A Chaotic Function with Some Extremal Properties
