Chaotic property for non-autonomous iterated function system
(ندگان)پدیدآور
Zamani Bahabadi, Alirezaeffati, monaHonary, Bahmanنوع مدرک
Textresearch paper
زبان مدرک
Englishچکیده
In this paper, the new concept of non-autonomous iterated function system is introduced and also shown that non-autonomous iterated function system IFS(f_(1,∞)^0,f_(1,∞)^1) is topologically transitive for the metric space of X whenever the system has average shadowing property and its minimal points on X are dense. Moreover, such a system is topologically transitive, whenever, there is a point like z∈U for each open and invariant set U from X so that N(z,U) has a positive upper density. It is also shown that topological transitivity is result of properties of shadowing and chain transitivity. The relation between average shadowing property , topological transitivity and chaotic non-autonomous iterated function system is studied .Moreover, it is also demonstrated that the first two conditions for the definition of chaos results the third condition. The topological mixing of such a system is obtained from shadowing property and chain mixing. Finally, we evaluated that the dynamical system (X, f) has Li-York e chaos under special conditions
کلید واژگان
non-autonomous iterated function systemChaos
topological transitivity
average shadowing property
شماره نشریه
13تاریخ نشر
2018-03-011396-12-10
ناشر
Science and Research Branch, Islamic Azad Universityدانشگاه آزاد اسلامی واحد علوم و تحقیقات
سازمان پدید آورنده
Department of Mathematics, Ferdowsi University of Mashhad, Mashhad, Iran.Ph.D Student, Department of Mathematics, Ferdowsi University of Mashhad, Mashhad, Iran.
Department of Mathematics, Ferdowsi University of Mashhad, Mashhad, Iran.




