Symbolic Representations of Iterated Maps
作者: Xin-Chu Fu , Weiping Lu , Peter Ashwin , Janiqiao Duan
关键词:
摘要: This paper presents a general and systematic discussion of various symbolic representations iterated maps through subshifts. A unified model for all continuous on metric space is given. It shown that at most the second order representation enough map. By introducing distillations, partial of some are obtained. Finally, partitions representations class discontinuous examples are discussed.
umk.pl
hw.ac.uk
torun.pl
apcz.pl参考文章(18)
Stephen Wiggins, Global Bifurcations and Chaos Applied Mathematical Sciences. ,(1988) , 10.1007/978-1-4612-1042-9
Bruce P. Kitchens, Symbolic Dynamics: One-sided, Two-sided and Countable State Markov Shifts ,(1997)
Stephen Wiggins, Global Bifurcations and Chaos: Analytical Methods ,(1988)
Arek Goetz, Dynamics of piecewise isometries Illinois Journal of Mathematics. ,vol. 44, pp. 465- 478 ,(2000) , 10.1215/IJM/1256060408
Douglas A. Lind, Brian Marcus, An Introduction to Symbolic Dynamics and Coding ,(2010)
Bai-Lin Hao, Wei-Mou Zheng, Applied Symbolic Dynamics and Chaos ,(1998)
Hao Bailin, Elementary Symbolic Dynamics And Chaos In Dissipative Systems ,(1989)
R. Adler, Similarity of automorphisms of the torus Lecture Notes in Mathematics. pp. 63- 64 ,(1971) , 10.1007/BFB0070153
Xin-Chu Fu, Criteria for a general continuous self-map to have chaotic sets Nonlinear Analysis-theory Methods & Applications. ,vol. 26, pp. 329- 334 ,(1996) , 10.1016/0362-546X(94)00259-K
Arek Goetz, , Dynamics of a piecewise rotation Discrete and Continuous Dynamical Systems. ,vol. 4, pp. 593- 608 ,(1998) , 10.3934/DCDS.1998.4.593