Crossref Citations
This article has been cited by the following publications. This list is generated based on data provided by
Crossref.
Bobok, Jozef
2002.
Chaos in countable dynamical system.
Topology and its Applications,
Vol. 126,
Issue. 1-2,
p.
207.
Huang, Wen
and
Ye, Xiangdong
2002.
Devaney's chaos or 2-scattering implies Li–Yorke's chaos.
Topology and its Applications,
Vol. 117,
Issue. 3,
p.
259.
Jiménez López, Víctor
and
Snoha, L'ubomír
2003.
Stroboscopical property in topological dynamics.
Topology and its Applications,
Vol. 129,
Issue. 3,
p.
301.
Balibrea, F.
Reich, L.
and
Smítal, J.
2003.
Iteration Theory: Dynamical Systems and Functional Equations.
International Journal of Bifurcation and Chaos,
Vol. 13,
Issue. 07,
p.
1627.
Mai, Jie-Hua
2004.
Devaney’s chaos implies existence of 𝑠-scrambled sets.
Proceedings of the American Mathematical Society,
Vol. 132,
Issue. 9,
p.
2761.
García Guirao, Juan Luis
and
Lampart, Marek
2005.
Li and Yorke chaos with respect to the cardinality of the scrambled sets.
Chaos, Solitons & Fractals,
Vol. 24,
Issue. 5,
p.
1203.
Guirao, Juan Luis García
and
Lampart, Marek
2006.
Relations between distributional, Li–Yorke and ω chaos.
Chaos, Solitons & Fractals,
Vol. 28,
Issue. 3,
p.
788.
Liao, Gongfu
Wang, Lidong
and
Duan, Xiaodong
2007.
A chaotic function with a distributively scrambled set of full Lebesgue measure.
Nonlinear Analysis: Theory, Methods & Applications,
Vol. 66,
Issue. 10,
p.
2274.
Ye, Xiangdong
and
Zhang, Ruifeng
2008.
Countable Compacta Admitting Homeomorphisms with Positive Sequence Entropy.
Journal of Dynamics and Differential Equations,
Vol. 20,
Issue. 4,
p.
867.
Oprocha, Piotr
and
Štefánková, Marta
2008.
Specification property and distributional chaos almost everywhere.
Proceedings of the American Mathematical Society,
Vol. 136,
Issue. 11,
p.
3931.
Oprocha, Piotr
2009.
Distributional chaos revisited.
Transactions of the American Mathematical Society,
Vol. 361,
Issue. 9,
p.
4901.
Oprocha, Piotr
2009.
Invariant scrambled sets and distributional chaos.
Dynamical Systems,
Vol. 24,
Issue. 1,
p.
31.
Blanchard, François
2009.
Topological chaos: what may this mean?.
Journal of Difference Equations and Applications,
Vol. 15,
Issue. 1,
p.
23.
Wang, Hui
Liao, Gongfu
and
Fan, Qinjie
2009.
A note on the map with the whole space being a scrambled set.
Nonlinear Analysis: Theory, Methods & Applications,
Vol. 70,
Issue. 6,
p.
2400.
BALIBREA, FRANCISCO
GUIRAO, JUAN L. G.
and
OPROCHA, PIOTR
2010.
ON INVARIANT ε-SCRAMBLED SETS.
International Journal of Bifurcation and Chaos,
Vol. 20,
Issue. 09,
p.
2925.
Bruin, Henk
and
Jiménez López, Víctor
2010.
On the Lebesgue Measure of Li-Yorke Pairs for Interval Maps.
Communications in Mathematical Physics,
Vol. 299,
Issue. 2,
p.
523.
Hosaka, Tetsuya
2010.
CAT(0) groups and Coxeter groups whose boundaries are scrambled sets.
Journal of Pure and Applied Algebra,
Vol. 214,
Issue. 6,
p.
919.
Fu, Xin-Chu
Chen, Zhan-He
Gao, Hongjun
Li, Chang-Pin
and
Liu, Zeng-Rong
2010.
Chaotic sets of continuous and discontinuous maps.
Nonlinear Analysis: Theory, Methods & Applications,
Vol. 72,
Issue. 1,
p.
399.
Subrahmonian Moothathu, T.K.
2011.
Syndetically proximal pairs.
Journal of Mathematical Analysis and Applications,
Vol. 379,
Issue. 2,
p.
656.
Naghmouchi, Issam
2011.
On the measure of scrambled sets of tree maps with zero topological entropy.
Journal of Difference Equations and Applications,
Vol. 17,
Issue. 12,
p.
1715.